Initial-Boundary Value Problems and the Navier-Stokes Equations
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Initial-Boundary Value Problems and the Navier-Stokes Equations
Initial-Boundary Value Problems and the Navier-Stokes Equations
This is Voliime 136 in PURE AND APPLIED MATHEMATICS
H. Bass, A. Borel, J. Moser; and S.-T. Yau, editors Paul A. Smith and Samuel Eilenberg, founding editors A list of titles in this series appears at the end of this volume.
Initial-Boundary Value Problems and the Navier-Stokes Equations Heinz-Otto Kreiss Jens Lorenz Applied Mathematics California Institute of Technology Pasadena, California
ACADEMIC PRESS, INC. Harconl-t Brace Jovanovich, Publishers Boston San Diego New York Berkeley Loridon Sydney Tokyo Toronto
Copyright @ 1989 by Academic Press, Inc. All rights reserved. No part of this publication may be reproduced or transmitted in any form or by any means, electronic or mechanical, including photocopy, recording, or any information storage and retrieval system, without permission in writing from the publisher.
ACADEMIC PRESS, INC. 1250 Sixth Avenue, San Diego, CA 92101
United Kingdom Edition published by ACADEMIC PRESS, INC. (LONDON) LTD. 24-28 Oval Road, London NW1 7DX
Library of Congress Cataloging-in-Publication Data Kreiss, H. (Heinz) Initial-boundary value problems and the Navier-Stokes equations / Heinz-Otto Kreiss, Jens Lorenz. p. cm. - (Pure and applied mathematics ; v. 136) Bibliography: p. Includes index. ISBN 0-12-426125-6 1. Initial value problems. 2. Boundary value problems. 3. Navier . 11. Title. -Stokes equations. I. Lorenz, Jens. Date111. Series: Pure and applied mathematics (Academic Press) : 136. QA3.P8 vol. 136 [QA3781 510 s-dc 19 88-7618 [5 15.3'51 CIP Printed in the United States of America 89909192 987654321
Contents
Introduction
Chapter 1. The Navier-Stokes Equations 1.1 Some Aspects of Our Approach 1.2 Derivation of the Navier-Stokes Equations 1.3 Linearization and Localization
Chapter 2. Constant-Coefficient Cauchy Problems 2.1 2.2 2.3 2.4 2.5
ix 1 2 9 18
23
Pure Exponentials as Initial Data Discussion of Concepts of Well-Posedness Algebraic Characterization of Well-Posedness Hyperbolic and Parabolic Systems Mixed Systems and the Compressible N-S Equations Linearized at Constant Flow 2.6 Properties of Constant-Coefficient Equations 2.7 The Spatially Periodic Cauchy Problem: A Summary for Variable Coefficients Notes on Chapter 2
79
Chapter 3. Linear Variable-Coefficient Cauchy Problems in 1D
81
3.1 A Priori Estimates for Strongly Parabolic Problems
82
24 34 44
55 62 66 73
V
vi
Contents
3.2 Existence for Parabolic Problems via Difference Approximations 3.3 Hyperbolic Systems: Existence and Properties of Solutions 3.4 Mixed Hyperbolic-Parabolic Systems 3.5 The Linearized Navier-Stokes Equations in One Space Dimension 3.6 The Linearized KdV and the Schrodinger Equations Notes on Chapter 3
Chapter 4. A Nonlinear Example: Burgers’ Equation 4.1 Burgers’ Equation: A Priori Estimates and Local Existence 4.2 Global Existence for the Viscous Burgers’ Equation 4.3 Generalized Solutions for Burgers’ Equation and Smoothing 4.4 The Inviscid Burgers’ Equation: A First Study of Shocks Notes on Chapter 4
Chapter 5. Nonlinear Systems in One Space Dimension 5.1 5.2 5.3 5.4
The Case of Bounded Coefficients Local Existence Theorems Finite Time Existence and Asymptotic Expansions On Global Existence for Parabolic and Mixed Systems Notes on Chapter 5
Chapter 6. The Cauchy Problem for Systems in Several Dimensions 6.1 Linear Parabolic Systems 6.2 Linear Hyperbolic Systems 6.3 Mixed Hyperbolic-Parabolic Systems and the Linearized Navier-Stokes Equations 6.4 Short-Time Existence for Nonlinear Systems 6.5 A Global Existence Theorem in 2D Notes on Chapter 6
Chapter 7. Initial-Boundary Value Problems in One Space Dimension 7.1 7.2 7.3 7.4
A Strip Problem for the Heat Equation Strip Problems for Strongly Parabolic Systems Discussion of Concepts of Well-Posedness Half-Space Problems and the Laplace Transform
87
100 111
113
115 118
121 122 131 138 141 156
159 160 165 167 172 175
177 177 181 188 190 198 202
203 204 21 1 222 228
Contents
7.5 Mildly 111-Posed Half-Space Problems 7.6 Initial-Boundary Value Problems for Hyperbolic Equations 7.7 Boundary Conditions for Hyperbolic-Parabolic Problems 7.8 Semibounded Operators Notes on Chapter 7
Chapter 8. Initial-Boundary Value Problems in Several Space Dimensions 8.1 Linear Strongly Parabolic Systems 8.2 Symmetric Hyperbolic Systems in Several Space Dimensions 8.3 The Linearized Compressible Euler Equations 8.4 The Laplace Transform Method for Hyperbolic Systems 8.5 Remarks on Mixed Systems and Nonlinear Problems Notes on Chapter 8
vii
248 253 262 268 272
275 275 283 302 306 322 323
Chapter 9. The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
325
9.1 The Spatially Periodic Case in Two Dimensions 9.2 The Spatially Periodic Case in Three Dimensions
325 337
Chapter 10. The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions 10.1 The Linearized Equations in 2D 10.2 Auxiliary Results for Poisson’s Equation 10.3 The Linearized Navier-Stokes Equations under Boundary Conditions 10.4 Remarks on the Passage from the Compressible to the Incompressible Equations
345 348 349 355 359
Appendix 1: Notations and Results from Linear Algebra
361
Appendix 2: Interpolation
365
Appendix 3: Sobolev Inequalities
371
Appendix 4: Application of the Arzela-Ascoil Theorem
389
References
395
Author Index
399
Subject 1nde.u
401
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Introduction
The aim of this book is to develop a theory of initial-boundary value problems for linear and nonlinear partial differential equations. There are already many books available, and we shall list some of them after the introduction. However, the area is vast, and any one book can only treat certain aspects of the theory. Our choice of material is very much influenced by the availability of fast computers. They have made it possible to solve rather complex problems for which the classical theory of second-order equations is not adequate. Existence and regularity questions play a fundamental r61e in computations because the resolution required depends on the smoothness of the solution, and there is always the danger that one tries to compute things which do not exist. Another fundamental question concerns admissible boundary conditions, which we shall discuss in great detail. In computations the boundary conditions cause most of the problems. We believe that this book can fill a gap between elementary and rather abstract books. To illustrate our theory, we have chosen the compressible and incompressible Navier-Stokes (N-S) equations, which describe fluid flows ranging from large scale atmospheric motions to the lubrication of ball bearings. The choice was dictated by the desire to find a system which is so rich in phenomena that the whole power of the mathematical theory is needed to discuss existence, smoothness and boundary conditions. We hasten to add, however, that we only scratch the surface of the diversity in which its solutions can behave. For exam-
ix
X
Initial-Boundary Value Problems and the Navier-Stokes Equations
ple, turbulent flow is described by the N-S equations, and at present no adequate mathematical theory is available. There are different ways to develop the theory. One way is to start with weak solutions and then to discuss their smoothness. This approach can lead to difficulties when it comes to boundary conditions and to nonlinear equations. For numerical calculations one is very much interested in knowing the exact smoothness behavior "up to" the boundary. Also, for nonlinear problems it is often difficult to show that the weak solutions have sufficient regularity (smoothness) in order to make them unique. We proceed instead in the following way: First we show, by using difference approximations for linear problems and linearization for nonlinear problems, that there is a set of C3"-smooth data, dense in Lz, for which the equations we discuss have C"-smooth solutions. These solutions and their derivatives can be estimated in terms of the data. Then we use the usual closure argument to define weak solutions if the data are less smooth. This process is much closer to computing than the previous one: If one wants to compute solutions with discontinuous data then one obtains better results if one approximates the discontinuous data by smoother data. Also, in computations of solutions of nonlinear problems, one adds terms in the equation (numerical dissipation) so that the solutions do not develop discontinuities. We proceed analogously in the analytic theory of hyperbolic equations and treat these as a limit of parabolic ones. The latter have Cm-smooth solutions for C3"-smooth data. For the Euler equations (which are identical with the N-S equations without viscous term) this corresponds to replacing the inviscid equations by the viscid equations. In general, this process of adding a formally small higher-order derivative term is doubtful: There is no assurance that one obtains anything meaningful in the limit as the term goes to zero. However, for problems coming from applications, the extra terms are often present in the full equations and have only been neglected - without mathematical justification to formally simplify the equation. We would like to thank our students who partly read the manuscript and suggested valuable improvements. Thanks is due also to Linda Soha, who expertly typed a large part of the manuscript. We wish to acknowledge the support of our research by the National Science Foundation (contract number DMS-83 12264), by the Office of Naval Research (contract number N-0001483-K-0422), and by the Department of Energy (contract number DE-AS0376ER72012).
xi
Introduction
Text and Reference Books Courant, R., and Hilbert, D. (1962). “Methods of mathematical physics”, Vol 11, Interscience.
Friedman, A. (1964). “Partial differential equations of parabolic type”, Reprint, Krieger, 1983. Garabedian, P.R. (1964). “Partial differential equations”, Wiley. Hellwig, G. (1964). “Partial differential equations, an introduction”, Blaisdael. Henry, D. ( 1 98 1). “Geometric theory of semilinear parabolic equations”, Lecture Notes in Math. 840, Springer. John, F. (197 1). “Partial differential equations”, Springer. Mizohata, S. (1973). “The theory of partial differential equations”, Cambridge University Press. Petrovskii, I.G. ( 1954). “Lectures on partial differential equations”, Interscience. Treves, F. (1975). “Basic linear differential equations”, Princeton University Press. Weinberger, H.F. (1965). “A first course in partial differential equations with complex variables and transform methods”, Wiley.
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1
The Navier-Stokes Equations
In this preliminary chapter we first outline some questions which will be treated in this book. Then we derive the Navier-Stokes equations. Though the derivation will not be used later, it is of interest to understand the underlying logical and physical assumptions, because the mathematical theory of the equations is not complete. There is no existence proof except for small time intervals. Thus it has been questioned whether the N-S equations really describe general flows. If one changes the stress tensor such that diffusion increases when the velocities become large, then existence can be shown. This change of the equations does not seem to be justified physically, however. For example, certain similarity laws - valid for the Navier-Stokes equations - are well-established experimentally, but the modified equations do not allow the corresponding similarity transformations. Possibly a lack of mathematical ingenuity is the reason for the missing existence proof, and the N-S equations are physically correct. The N-S equations form a quasilinear differential system, and much of our understanding of such systems is gained through the study of linearized equations. These will, in general, have variable coefficients. By fr-eezing the coefficients in such a problem, one obtains systems with constant coefficients. It is much easier to analyse the latter, as will be later shown in Chapter 2. However, the relation between variable-coefficient and constant-coefficient equations is not trivial. The fundamental ideas of linearization and localization are discussed in Section 1.3.
2
Initial-Boundary Value Problems and the Navier-Stokes Equations
1.1. Some Aspects of Our Approach 1.1.1.
The Equations, Initial and Boundary Conditions
Neglecting effects due to thermodynamics, i.e., assuming constant entropy, the full N-S equations consist of the three momentum equations
Du
p~
+ grad p = P + pF,
the continuity equation pt
+ div (pu) = 0,
and an equation of state P = T(P). Here the velocity u = (u, u , w),the density p, and the pressure p are the unknowns, F is a given forcing, and r(p) with dr/dp > 0 is assumed to be a known function. Furthermore, we have used the common notations
(;;) (2;;;) dP/dX
gradp=
div (PU) = (P’IL),
=
7
+ (P4, + (PW),,
The term P is defined by
P = ( p + p’)grad (div u) + pAu = ( p + p’) (div u),
Aw
where A denotes the Laplacian, and p and p’ are nonnegative material constants, assumed to be known. In most applications one deals with simplified equations: incompressible flow, p = PO a known constant, the equation of state is dropped. Most of the mathematical theory is done for this case. After choosing suitable units, one can assume p = I , and the equations read
Case I.
Du
-
Dt
+ grad p = vAu + F,
div u = 0 (v = p / p ~ ) .
3
The Navier-Stokes Equations
Note that the momentum equation and the equation div u = 0 are of different type. This makes the existence theory more difficult. Indeed, the small-time existence theory for the compressible equations is somewhat easier than the theory for the incompressible case. However, as we will show, the vorticity formulation allows a systematic treatment of the incompressible equations. Using the idea of initialization for problems with different time scales, one can also treat the incompressible case as a limit of compressible ones: Compressible but inviscid flow, i.e., p’ = p = 0. One obtains the full equations with P = 0. The resulting system - possibly augmented by an energy equation - is fundamental in gas dynamics; Case 2.
Case 3.
Inviscid, incompressible flow. The equations are known as Euler
equations:
- + grad p D U
Dt
= F:
div u = 0.
The differential equations have to be supplemented by initial and boundary conditions. The mathematically easiest case is the Cauchy problem with periodic initial data, where one seeks for solutions periodic in space. Loosely formulated, the following results are known for the viscous equations: 1. If the initial data are sufficiently smooth, then there is a time T
> 0 such
that the N-S equations have a unique smooth solution for 0 5 t 5 T. The time T depends on the initial data. 2. In the incompressible case one can say more: The solution is analytic for 0 < t 5 T. Furthermore, if the velocity u satisfies a bound in maximum norm* like
then the solution can be continued for a time At > 0, which only depends on C. This latter result guarantees - for the viscous incompressible case that the solution can be continued as long as the velocities stay uniformly bounded. In other words, it is not possible that the solution ceases to exist because just derivatives of u become large; u has to become large itself. In experiments extremely large velocities are not observed. The maximal velocity hardly ever exceeds twice the mean velocity. This nourishes the hope that it might be possible to derive uniform bounds for u and thus
(uI
-I- w ’ ) ’ / ~we denote the Euclidean length of a vector u. The notion *By = (u2 -k maximum norm refers to maximization w.r.t. to the arguments z,y, z .
4
Initial-Boundary Value Problems and the Navier-Stokes Equations
to prove existence at all times. Thus far, however, this has not been achieved.
In practical applications one studies flows in finite domains and most of the interesting phenomena happen near the boundary. Therefore, it is of great interest to study initial-boundary value problems. Indeed, most of the results formulated for the Cauchy problem can be camed over to suitably posed initial-boundary value problems using the general theory of partial differential equations. It is one of the main aims of the second part of these notes (starting in Chapter 7) to describe techniques for choosing correct boundary conditions, i.e., boundary conditions which lead to a mathematically well-posed problem. 1.1.2. Shocks and Weak Solutions For the inviscid compressible case of the N-S equations the solution can cease to exist though u stays uniformly bounded. This can be illustrated by the inviscid
Burgers’ equation: (1.1.1)
ut
1 + -(u2)* 2
= 0.
Discontinuities (shocks) for u ( z , t ) can develop in finite time though u stays uniformly bounded. We will show this by the method of characteristics. Thus a classical solution can cease to exist in a finite time. To obtain existence of a solution for all time, one can broaden the solution concept and allow for weak solutions. Let us illustrate this for equation (1.1.1) together with an initial condition
4 x 7 0 ) = f<.),
( 1. I .2)
where f(x) is a smooth* function with compact support. Later we shall show that the (regularized) problems
together with the initial condition (1.1.2) have a unique smooth solution u<(.r,t ) existing for all time. Furthermore, c.2
Iuu.,(..t)l,
L
I%(.,
O)Ic.2,
* A function is called smoorh if it has sufficiently many continuous derivatives. We use this convenient term whenever more precise smoothness specifications are unimportant for our arguments.
5
The Navier-Stokes Equations
This allows us to show that there is a unique function U O ( T . t ) . satisfying the above inequalities, such that for every smooth test function 4(x,t ) with compact support
( I . 1.4) lim -0
f
Lrn1:
1L:(x. t)d(.r,t ) d c dt =
br 1:
U i ( T ,t ) ( b ( X ,
t)dT dt.
j = 1,2.
The function ZIO is called a weak solution of the problem (1.1. I), ( I . 1.2). It is desirable to introduce and characterize weak solutions in a more direct way, without studying a regularization. To this end, let 4 = 4(x,t ) denote a smooth function with compact support. If we multiply (1.1.3) by 4 and integrate over
O
-m<xzm. we find after integration by parts 11 $z,s
dx dt
Using the initial condition and sending satisfies
t
--t
0, one finds from (1.1.4) that
u0
(1.1.5)
This relation does not involve the +dependent equation (1.1.3), and thus it motivates the
Definition. A function . U ( T , t) is called a weak solution of ( 1.1. I), ( 1.1.2) if ( 1.1.5) holds for all test functions 4. Our derivation shows that I L O ( X ,t ) is a weak solution. It turns out, however, that the given definition does not characterize a unique function. There is, in general, more than one weak solution if we accept the definition given above. From our point of view (and for physical reasons) it is natural to define weak solutions of the inviscid equations as the limit of solutions of the viscous equations. But unfortunately, for more general equations or systems of equations, one generally does not know whether this limit exists. Therefore, it seems to be advantageous to define weak solutions directly, without going through such a limit process. This is usually done by requesting an integral relation for certain
6
Initial-Boundary Value Problems and the Navier-Stokes Equations
test functions, as in ( l . l S ) , for example. In this way one can make the concept of a solution so weak that solutions do exist. However, often uniqueness becomes a problem. For the N-S equations there is no solution concept known which leads to both existence and uniqueness.
Scaling Arguments and Limiting Processes
1.1.3.
One of the most powerful tools for discussing properties of the N-S equations are scaling arguments. As an example we shall discuss some aspects of these arguments for the 2D inviscid compressible equations, which we write in the form ( 1.1.6) P(Ut
pt
+ up,
+ uu, + vu,) + p , = 0, + vpy + + v ) = 0, P(U,
p(vt
+
UV,
+ vu,) + p ,
= 0,
P = r(p).
.y
Assume that for a given flow we can scale the dependent and independent variables by u = UU’,
u = UV’.
p = Qp’,
x = Lx‘,
y = Ly‘.
t = Tt’,
p = Pp’,
so that u’. d. pi, p’ and their first derivatives are of order O(1). Here U , Q , P, L , T are positive constants and Q , P are assumed to be compatible with the equation of state, i.e., P = r(Q). If, for example, p = pY then P = Q Y , and thus p’ = p l y ; i.e., the equation of state remains unchanged by the transformation. Introducing the new variables into the equations above, we find p‘(u;, p’(v;,
UT UT 1 , + -(u’u:, + v uyt))+ --p,, L L M2 I
+ -U(LuT
‘
I
+
‘
v,c‘ v‘v;!))
+ TU@T P1l y ’
= 0,
U2Q M2= -
P 1
= 0,
Assume now that U T I L = 1 and that the equation of state remains unchanged by the transformation. If we drop the ’ sign in the notation, the equations become p(ut p(vt
1 + uu, + uu,) + -M2 p,
+
2121,
1 + vv,) + -M2 p
= 0, y
= 0’
The Navier-Stokes Equations
7
It follows from these equations - as we shall discuss later - that the type of the flow depends crucially on the so-called Mach number M introduced above. If M < 1, M = 1, M > 1, then the flow defined by the state (U,P = r(Q)) is called subsonic, trunssonic, or supersonic, respectively. Consider, for example, the case M +. 00. Formally we obtain in the limit the equations
+ + vuy = 0, vt + u21, + vvy = 0. Pt + up, + vpy + p(uz + = 0. ut
‘UU,
Uy)
Here the pressure has been eliminated, and the velocity equations are uncoupled from the density equation. We can also obtain the incompressible equations by a limit process from the equations governing compressible flows. To this end, assume that P = PO
+ Qp’,
PO = const,
IQI << 1,
p’ = O(1).
Thus the density is almost constant. For the pressure we obtain that
and therefore the pressure is correctly scaled if we write
P = PO + PP’, PO = r(po),
+
+
dr
P = &-(PO). dP
Introducing p = po Qp’, p = PO Pp’ and using the same scalings of u , v,z, y?t as above, we obtain from (1.1.6) the following system, where again ’ is dropped in the notation:
8
Initial-Boundary Value Problems and the Navier-Stokes Equations
Pt
+ v p ) + (PO +QQLp W T (u,+ vy) = 0,
UT
+ -(up, L
Y
Considering the limit process
UT -=I, L
Q-0,
M+O
but
Q
M 2 = 1,
we obtain formally the Euler equations, where the density equation above goes over in ti, ti,, = 0. We shall discuss this limit process in Chapter 10. Another limit is obtained for
+
Q-0,
UT L
-+O
but
UTQ+o#O;
LM2
UT QL
--P#O.
The resulting equations are
+ cup, = 0, Pt + PoP(U.Z + u y ) = 0, pout
Pout
+ "py = 0, P = P.
Combining these, we obtain the wave equation for p:
(In the original coordinate system where L = T = 1 the quantity ( d ~ ( p o ) / d p ) ' / ~ denotes the sound speed.) The above scaling arguments show that the N-S equations describe vastly different types of problems; these appear when certain parameters approach extreme values. One could believe that these extreme cases are practically uninteresting. However, the opposite is true: they represent the usual behavior. The reason is that the parameters do not need to take extreme values for the flow to have qualitatively the same behavior as suggested by the limiting equations. For example, a flow with M = 2 is in certain aspects not much different from the limiting flow corresponding to M = 00. Therefore, the analysis of the limiting equations is important. 1.1.4.
Remarks on Solution Estimates and Computations
9
The Navier-Stokes Equations
From a purely mathematical point of view the theory of the viscous N-S equations is in rather good shape, except for the question of long-time existence and the related question of blow-up. Once we assume a bound for the maximum norm of the solution, we can estimate all its derivatives and we know what boundary conditions to prescribe. Also, one understands various limit processes as long as v is fixed. In the incompressible case one can show that the j-th derivatives of the flowvariables are bounded in terms of
(IDu(.,t)l,v-1)J/2. where IDul, denotes the maximum norm of the velocity gradient. Let us discuss the implications in two space dimensions first. In 2D, the values IDu(.,t)l are essentially bounded by the initial data IDu(.,O)I. If we scale the variables such that IDu(..0)l = 1, then the j-th derivatives are bounded in terms of Y - J / ~ . In applications a value v = is not uncommon. If the derivatives are of the order O( 10’) everywhere, then we need O( lo6) computational points in a two-dimensional region. This stresses the capacities of today’s machines, but it is computationally feasible. In three space dimensions the velocity gradients are not bounded independently of v, but one can make a plausibility argument that (Du(.,t ) ( = O(v-’/’). For v = one would need O ( V - ~ /=~ 0(1027/2) ) computational points to resolve the flow; this is clearly beyond today’s (and tomorrow ’s) machines. Fortunately, the situation is not always this bad. There are many flows for which the derivatives are bounded independently of v. Other flows, particularly those in (compressible) gas dynamics, have derivatives bounded independently of v except near isolated sharp fronts (shocks). In this case one can replace a very small v by a larger value, without changing the structure of the flow away from the fronts. Burgers’ equation is a good example, and we shall discuss it in detail. To treat situations where derivatives are large in extended regions, we need a mathematical theory to identify functionals which depend smoothly on v as v + 0. These could be evaluated using larger U-values for computations, and could be extrapolated. These questions are closely related to turbulence models and so-called subgrid modeling.
1.2. Derivation of the Navier-Stokes Equations In this section we give a brief derivation of the N-S equations. Our presentation relies heavily on Meyer (1971) and Chorin and Marsden (1979). For additional
10
Initial-Boundary Value Problems and the Navier-Stokes Equations
information, see also Serrin ( 1959). The general logical assumptions underlying continuum mechanics - in particular smoothness assumptions - are not easily formulated and we do not discuss them here. Instead we give a rather uncritical intuitive description of the ideas of particle paths and velocity fields. Both concepts can serve to describe flows. The relation between both descriptions is discussed first. Then the laws of conservation of mass and change of momentum are formulated; these laws - in their differential form - constitute the fundamental differential equations discussed in this book. Specific assumptions about the stress tensor appearing in the momentum equations lead to the N-S system. The equations obey an important similarity law, which is strongly confirmed experimentally. This justifies indirectly the assumptions made about the stress tensor.
1.2.1. Eulerian and Lagrangian Descriptions Consider a body of fluid which - at time t = 0 - occupies some open bounded domain 00 with boundary 800. We think of every point a E 00 as a fluid particle whose motion we can follow for t 2 0. Its position at a later time t is denoted by @(a,t). At this time the fluid elements occupy the domain
Rt = {@(a,t ) : a E
no}.
The curve t -+ @(a,t) describes the trajectory of the fluid particle which at time f = 0 has the initial coordinate a = @(a.0). It is assumed that @(a,t ) # @(b,t) for t 2 0 if a # b; i.e., thefluid particles keep their identity. We formalize the basic assumption underlying the description of the flow in
Assumption 1.2.1. properties:
There exists a smooth function @(a,t) with the following
1. @(a,O)= a. 2. If a # b then @(a,t) # @(b,t ) for t 2 0. 3. The mapping a + @(a,t ) has a smooth inverse. These conditions are assumed to hold in 00U 800,i.e., the region including the boundary, Then, by general topological arguments, at any later time t the boundary dflLof 0, is the image of the original boundary:
dRt = {@(a,t ) : a E 8 0 0 ) . This will be used below. Let u(x. t) denote the fluid-velocity at x E 0, and time t . Then d u(x. t ) = -@(a, t ) if
at
x = @(a,t ).
11
The Navier-Stokes Equations
FIGURE 1.2.1.
Trajectory with velocity vector.
and thus we have (1.2.1)
d u(@(a,t ) ,t ) = -@(a, t ) , a E 00.
at
In principle, if the mapping cb = @(a,t ) describing the trajectories is known, then the velocity field u = u(x. t) can be obtained from (1.2.1). Conversely, if we know the velocity field u, then we can reconstruct the trajectories t + @(a.t ) by solving - for each fixed a E Ro - the (ordinary) initial value problems (1.2.1) with initial condition @(a,O) = a. Thus one can describe the fluid motion in terms of t and the initial position a E 00(the so-called material coordinate) or one can use t and the spatial coordinate x E at. The first way is known as Lagrangian description whereas the second is the Eulerian point of view. One can ask which description one should use in actual calculations. If discontinuity surfaces (e.g., density discontinuities) are present which move with the flow, then the Lagrangian way is advantageous: The location of the discontinuities in terms of the material coordinates remains fixed in time, and one can work with a description which is smooth with respect to t. On the other hand, watching the distortion which a blob of ink undergoes in a turbulent flow makes us wonder if the Lagrangian description is always useful. Here the initial coordinates lose their meaning. One prefers the Eulerian description if large distortions are present. Also, in numerical calculations it is quite common to use a combination of both descriptions. Let f = f(x, t) denote a scalar quantity depending smoothly on the Eulerian coordinates x E Rt and t. For example, f can denote the local fluid-density or
12
Initial-Boundary Value PrQblems and the Navier-Stokes Equations
the temperature. One can ask how the quantity f changes in time if one follows a trajectory x(t) = @(a,t). The chain rule and (1.2.1) imply that d a + .-fax + v-fdyd + w-f}(x(t), dz
d d -f(x(t), t ) = { -f at dt
(1.2.2)
=
t)
d {Zf + u . gradf)(x(t), t ) .
(Here u = (u, v , w) and x = (2, y, z).) This motivates us to introduce the operator D / D t acting on functions f = f(x, t ) in Eulerian coordinates:
D d -f(x, t ) = -f(x, t) u(x, t ) . gradf(x. t). Dt at The function (D/Dt)f(x, t ) is known as the material derivative o f f . One easily shows the product rule:
+
D D D =f + g D ,f Dt We consider now the time-change of integrals of the quantity f . Using the mapping @ to transform all integrals to the fixed domain no, one can show with the rules of calculus the (1.2.3)
-(fg)
Transport Theorem. ing holds:
Under appropriate smoothness assumptions the follow-
$It
f(x,t)dx =
where
+
+
div(fu) = ( f ~ ) ( ~f ~ ) (~ f ~ =) u~. gradf
+ fdivu.
A proof of the Transport Theorem is given, for example, in Hughes and Marsden (1976). With Gauss' Theorem
Ldivwdx =
s,,
w.ndS
one obtains further that
d
dt
I,
f(x, t )dx =
J,,
a
,,f(X,
t ) dx
+
/
(fu . n)(x, t) dS,
362t
where n(x,t) denotes the unit outward normal of dRt and dS is the surface element. The amount of the quantity f in fl changes due to direct changes o f f and due to the $ow off across the boundary.
13
The Navier-Stokes Equations
If we apply the Transport Theorem with f
= 1, we obtain that
and thus each volume
6, =
volume(Rt) = is preserved in time if and only if div u
1.2.2.
1 dx
0.
Conservation of Mass and Balance of Momentum
We start with the conservation of mass, which can be formalized as follows:
Assumption 2.2.2. There exists a smooth function p = p ( x , t ) on each fluid domain Rt such that for all t 2 0,
2 0 defined
(1.2.4)
The function p is the fluid-density, and the integral (1.2.4) is the mass contained initially in Ro and conserved in time. Using the Transport Theorem, we find that
holds for any domain 0,; therefore, the integrand must vanish, and we obtain for p the so-called continuity equation: (1.2.5)
d
-p at
+ div (pu) = 0.
This equation often takes a simpler form: A fluid is called incompressible if p ( x , t ) = po = const.
For an incompressible fluid the continuity equation reads divu = 0, thus volumes are preserved. Conversely, if the flow is volume preserving, then divu = 0 and the continuity equation becomes Dp/Dt = 0. Under this assumption the Transport Theorem implies that p is constant w.r.t. x and t if the density is homogeneous at t = 0, i.e., p ( x , 0) = const. Let us now discuss the balance of momentum. The momentum of the fluid in the domain R t is
14
Initial-Boundary Value Problems and the Navier-Stokes Equations
By Newton's law, its time derivative equals the force which acts on the mass in Rt. We assume that this force is the sum of an external body force (e.g., gravity, the Coriolis force, or an electromagnetic force) and an internal force, which acts on the boundary of the fluid domain. The internal force is due to friction between fluid elements. We assume that it can be written in terms of a stress tensor field:
Assumption 1.2.3. field
There exists a force field F = F ( x , t ) and a stress tensor
(i;) (;;;;;; ;;;) sl2
s = S(x,t) = such that, for any fluid domain d
sl3
=
Qt,
p ( x , t ) u ( x , t ) dx =
1,
p( x . t ) F ( x . t ) d x
+
Note that this is a vector equation. Using Gauss' Theorem, we can write
1% .I,
divSdx,
divS =
Sn dx =
)(:I:
.
div s3
If we apply the Transport Theorem to each component of ( 1.2.6) we obtain that
Under appropriate smoothness assumptions the integrand must vanish, and, using the continuity equation, we find that (1.2.7)
D
p- u Dt
= pF
+ div S .
We refer to (1.2.7) as the momentum equation.
1.2.3. Forms of the Stress Tensor Any further analysis of the fluid motion depends on knowledge about the stress tensor S. We must relate S to the other flow variables. In many situations - in particular in gas dynamics - one can use a very simple form for S:
Definition. form:
A flow is called inviscid if the stress tensor S has the following
15
The Navier-Stokes Equations
(1.2.8)
S(x.t) = -p(x,t)
The scalar quantity p = p ( x , t ) is the pressure. For an inviscid flow the momentum equation (1.2.7) becomes
D Dt
(1.2.9)
p-u
+ gradp = pF.
Together with the continuity equation ( I .2.5), the vector equation ( I .2.9) represents a first-order system of four equations in the five scalar unknowns p. p . u. 71. w.There are two important different ways to complete the system. First, if the fluid is incompressible, i.e., if p(x, t ) = po is a known constant, we have the Euler equations: (1.2.10)
D -u Dt
+ -1 gradp = F.
div u = 0.
Po
A flow governed by these equations, i.e., an inviscid incompressible flow, is said to be ideal. Another way to complete the set of equations (1.2.5), (1.2.9) is to add an equation of state. In the absence of thermodynamic effects it takes the form P = r(p)
where r is a known function. The resulting system describes inviscid compressible flow. Let us consider again the viscous case, which requires a more general form of the stress tensor S than (1.2.8). The appropriate dependence of S on the other flow variables can only be inferred from observations. If the motion is uniform, i.e., if all velocity gradients are zero, then experiments show that the simple form (1.2.8) for S is still appropriate. Thus it is reasonable to assume at least as a first approximation - that S p I depends linearly on the matrix of velocity gradients:
+
(1.2.11)
s = -PI + S(T), S linear in T .
T = T(x. t ) =
(
71
,.
0, 7/1,,.
11
?,
ily
Uly
11 ijZ
)
.
U’,
Heuristically one can think of S(T) as the stresses due to viscous phenomena. The assumption (1.2.1 1) is made in most of classical fluid mechnics. We want to argue now that S only depends on the symmetric part of T , i.e., on the deformation tensor
16
Initial-Boundary Value Problems and the Navier-Stokes Equations
1
D = -(T + T * ) , 2 and not on the local rotation of the fluid, described by the antisymmetric part i ( T - T * )of T . Consider the Assume that the space between two long concentric cylinders is filled with fluid. Let the inner cylinder be forced to rotate slowly and let the outer cylinder be free. Then the fluid and the outer cylinder also begin to rotate. This can only be due to tangential stresses. After some time the outer cylinder and the fluid move with the same velocity as the inner cylinder. Thus, the motion has become like the rotation of a solid body; there is no momentum transfer anymore, and we have S = -PI. The matrix T corresponding to a solid rotation is antisymmetric. Therefore, it is reasonable to assume that S is zero for an antisymmetric argument and depends on the symmetric part D = i ( T T * ) of T only. One can prove (see Gurtin and Martins (1976)) Couette experiment.
+
Theorem 1.2.1. Assume that S = s ( D ) is a linear function of D which is invariant under all rotations of the coordinate system, i.e., S(UDU*) = US(D)U* for all orthogonal 3 by 3 matrices U and all symmetric 3 by 3 matrices D . Then S can be written as
+ + d33)1+ 2 p D :
S ( D ) = pCLl(di I
d22
where p and p‘ are constants independent of D. An application of this result gives us for the stress tensor:
S = -pI
+ p’ div u I + p(T + T * ) .
If we substitute this expression into the momentum equation (1.2.7), we obtain together with the continuity equation - the so-called Navier-Stokes system. The material constants y and p’ depend on the temperature and the chemical properties of the fluid. The coefficient p is known as the shear viscosity and = y’ + $ p is the bulk viscosity. Again, one distinguishes incompressible and compressible flow. In the first case one has p(x. t ) = PO, div u = 0; for compressible flow one uses an equation of state p = r ( p ) to complete the system. The resulting equations are listed in Section 1.1. -
<
17
The Navier-Stokes Equations
1.2.4. The Similarity of Flows and the Reynolds Number One of the most important tools in hydrodynamics is to scale the variables. This enables one both to simplify the equations by neglecting terms and to use one calculation or experiment to obtain results for another similar problem. We shall explain the procedure for incompressible flow without external forces. To this end, assume we have a fluid with density p and viscosity p. Its motion satisfies 0 -u dt
P + (u . grad)u + -1 gradp = -Au.
divu = 0. P P We consider (1.2.12) in a time-independent domain R with initial conditions in R and boundary conditions on do. Suppose now that we want information about another fluid with density p and viscosity fi, in a geometrically similar domain fi = LR. The functions ii = a(%.i), p = $(%,t) satisfy (1.2.12)
and are subject to initial conditions in 0 and boundary conditions on pose further that we can find scaling transformations
ii=Uu. % = L x . p = P p , f = T t ,
80. Sup-
U,L.P,T=const,
such that the transformed functions
u’(%.i) := Uu(x, t ) = Uu(f/L: f / T ) , p’(%,i) := Pp(x.t ) = P p ( % / L i. / T ) satisfy the same initial and boundary conditions as ii and @. From d
-u‘ =
8
-U_d
T atu‘ U Au‘ = -Au, L2
U
grad u‘ = - grad u. L
P L
gradp’ = - gradp
and (1.2.12) we find that
Thus the functions u’, p’ satisfy the same equations as ii. fi if (1.2.13)
If these relations for the scaling parameters are satisfied and if the initialboundary value problem for 0 . 5 has a unique solution, then we can conclude that
18
Initial-Boundary Value Problems and the Navier-Stokes Equations
ii(%, f) = UU(X,t ) = UU(W/L,iT/T), fi(%]iT) = Pp(x,t ) = P p ( % / LiT/T). , The requirements simplify if the coefficients in the boundary conditions do not depend on time, because we can choose T arbitrarily. If we take T = L / U , then (1.2.13) requires that
U=p
p = P l
ULZ, P -- - . P
P
Roughly speaking, flows are similar if their respective values for
U2Z,
- and for
ULp
--R
P P coincide. The number R is called the Reynolds number of the flow. As mentioned above, the similarity law has been confirmed by experiments over and over again. Indirectly, this experimental fact supports and justifies the basic assumption underlying the Navier-Stokes equations, namely that the stress tensor depends linearly on the velocity gradients and not on other fluid variables.
1.3. Linearization and Localization In this section we outline some basic mathematical questions which will be treated more thoroughly in the subsequent chapters. We want to solve the socalled Cauchy problem for systems of quasilinear partial differential equations (1.3.1)
ut = P ( z , t , U , d/dz)u
+ F ( z >t ) ,
2
E R":
0 5 t 5 T:
with initial conditions (1.3.2)
u(z,O) = f(z).
z E R".
Here u' = ( X I , . . . , x , ~ E) R" is the vector of independent space variables and u = u(x.t ) denotes the solution to be determined, which takes values in C". The operator P = P(z,t,u.d/dz) is a quasilinear differential operator of order m of the general form
Here IvI = V I + . . . + v , for ~ any multi-index v = ( U I, . . . , v , ~ )The . coefficients
A,, = A,,(x. t1u ) E C'"'
19
The Navier-Stokes Equations
are given smooth matrix functions of the arguments
Also, the forcing function F in (1.3.1) and the initial function f in (1.3.2) are assumed to be given. More specific assumptions and boundary conditions will be discussed later. From a purely mathematical point of view there are two fundamental questions: 1. When can one guarantee that the problem (1.3. l), (1.3.2) has a unique
solution, at least for a small time interval? 2. Assuming that (1.3. l), (1.3.2) has a unique solution u for some fixed F, f, what is the influence on the solution of small perturbations added to F and f ? The second question can be rephrased more precisely as follows: Replace F by F 6 F in (1.3.1) and f by f 6f in (1.3.2), and thus consider a perturbed problem
+
(1.3.3) ( I .3.4)
+
~t = V ( Z , 0)
P ( J ,t , u , d / d s ) V + F
+ 6F.
z E R”,
0 5 t 5 T.
+
= f(z) Sf(z), s E R”.
If (1.3.1), (1.3.2) is “physically reasonable”, one can hope that the perturbed problems (1.3.3), (1.3.4) are also uniquely solvable, at least for sufficiently small perturbations, and that their solutions can be written as 2)
= 21
+ 6u.
where 6u satisfies an estimate (1.3.5)
Il6ull(l, 5 K(ll6FIl(2) + Il6fll(3,).
Here (16u(Lll(l), J(SF11[2),Il6fll(3, are certain norms which still have to be specified. The constant K in (1.3.5) should be independent of 6F and 6f as long as the perturbations are kept sufficiently small. This leads to the preliminary
Definition. Assuming that (1.3.l), (1.3.2) has a unique solution u for some fixed F, f, we say that the nonlinear problem (1.3.l), (1.3.2) is well-posed at u if there is an E > 0 s.t. for all smooth functions 6F and 6f with
+ Ilofll(3, I E
116~11(2,
the perturbed problem (1.3.3), (1.3.4) is also uniquely solvable, and 6u := u - u satisfies an estimate (1.3.5) with K independent of 6F and 6f. Note that we still have to specify the norms. Indeed, different norms lead to different concepts of well-posedness, as we will discuss below.
20
Initial-Boundary Value Problems and the Navier-Stokes Equations
We will try to show the existence of a solution of the nonlinear problem (1.3.1), (1.3.2) in a sufficiently small time interval by considering the sequence uk - , u k (z,t) of functions defined iteratively through the linear equations = P ( z ,t , uk(z:, t ) ,d/dz)u"'
uf"
+ F ( z ,t ) ,
uk+'(z,O)= f(z), k = 0, 1 , . . . , uO(z,t )
= f(z).
For this reason, we first have to study the Cauchy problem for linear equations (1.3.6)
Ut
= P ( z ,t , d/dz)u
+ F ( z ,t ) .
Here
and the coefficients A, = A , ( z , t) depend smoothly on (z, t). Also, the question of well-posedness at u,which we formulated above for the nonlinear problem (1.3. l), (1.3.2), is closely related to well-posedness of linearized equations. Roughly speaking, the following linearization principle holds: A nonlinearproblem is well-posed at u if the linear problems which are obtained by linearizing at all functions near u are well-posed. Thus we will study linear equations first. In order to understand the basic questions of existence, uniqueness, and well-posedness for them, it suffices to treat just the homogeneous case, i.e., one can take F = 0 in (1.3.6). Inhomogeneous equations can then be treated by Duhamel's principle. More importantly, it is desirable to relate the well-posedness of the Cauchy problem for a variable-coefficient equation (1.3.8)
ut = P ( z ,t , d / d x ) u
to the well-posedness for the constant-coefficient equations (1.3.9)
ut = P(z0:t o , d/dz)u
which are obtained by freezing the coefficients
21
The Navier-Stokes Equations
at arbitrary but fixed points ( T O :to). This idea is called localization. By Fourier transformation, the discussion of constant-coefficient problems can be reduced to purely algebraic questions; this will be canied out in Chapter 2. The localization principle one would like to have, can be formulated as follows: If all frozen-coefficient problems are well-posed then the corresponding variable-coefficient problem is also well-posed. It should be noted in advance that this principle is not valid for general linear variable-coefficient operators. However, the differential operators which appear in the context with the N-S equations are of parabolic, of hyperbolic, or of mixed hyperbolic-parabolic type, and for these classes of operators the above localization principle turns out to be applicable.
Formal linearization. To explain the process of linearization, we consider Burgers’ equation as an example: ( 1 .3.10)
211
= uu,
+ EU,,,
E
> 0.
Suppose U = U(x,t)is a smooth function. We may think of U as a known approximate solution of (1.3. lo), but this is not essential. If we substitute 21
=
u + u’,
‘11’
=
d(Z,
t)
into (1.3.10), then we obtain
+
u: = U X d Uu:
+ u’u: + eukZ + F,
F = UU,
+ EU,,,
-
U,.
Thus far, no terms have been neglected. Since we consider u’ as a small correction to U , we neglect the quadratic term u’u; and write instead of u’. Thus we obtain the linear equation ut = U,U
+ UP),+ EU,, + F.
This equation is called the linearization of (1.3.10) at U , or the linearized equation. Note that F = 0 if and only if U solves (1.3.10) exactly. The linearized equation governs the influence of small perturbations on U . This is another important reason to study linear equations.
This Page Intentionally Left Blank
2
Constant-Coefficient Cauchy Problems
The main tool to discuss constant-coefficient problems (with initial data given on the whole space) is the Fourier transformation. It allows us to "decompose" general initial data into pure exponentials. One easily observes that - in case of constant coefficients - the time evolution of each pure (spatial) exponential can be treated separately. We introduce the symbol P(iw) of a differential operator P ( d / d z ) and obtain u(T*t ) = e + . 4 e p ( l w ) f
f -(4)
as the solution for initial data u ( t , O ) = P'(''.")~(w'). Well-posedness of the Cauchy problem can be characterized in terms of estimates for the symbol. We will start out with some special cases, namely hyperbolic and parabolic systems in one space dimension. For these, the conditions for the symbol are easily checked, and one can solve the Cauchy problem. In Section 2.3 we characterize families of matrices A for which the exponential ent. t 2 0. is uniformly bounded. This result, which is central in a general theory of wellposedness, will be applied in Section 2.4 to characterize those first-order systems (in any number of space dimensions) which lead to well-posed Cauchy problems; the corresponding systems are called strongly hyperbolic. An important example is given, the compressible Euler equations linearized about a constant flow. Similarly, linearization about a constant flow of the viscous compressible NavierStokes equations leads to a mixed hyperbolic-parabolic system; applying the
23
24
Initial-Boundary Value Problems and the Navier-Stokes Equations
same general principles, we obtain well-posedness of the Cauchy problem and can solve these linearized problems by Fourier transformation. Though constant-coefficient equations are of some interest by themselves, they are too restrictive for most applications. If one freezes variable coefficients at arbitrary points, then obviously constant-coefficient equations are obtained. Unfortunately however, it is possible that all frozen-coefficient problems are well-posed and the given variable-coefficient equation is ill-posed nevertheless. Roughly speaking, switching between variable and constant coefficients introduces lower-order terms. Naturally, this leads to the question: Which constantcoefficient problems can be perturbed by (arbitrary) lower-order terms without losing well-posedness? As we will show in Section 2.6, the answer is that only strongly hyperbolic and parabolic problems have this property. To obtain this result, we use a restrictive but simple concept of well-posedness: It must be possible to estimate the Lz-norm of the solution at later times in terms of the &-norm of the initial function; derivative terms of the initial function are not permitted in the estimate. This idea guides our discussion of well-posedness. At the end of this chapter, in Section 2.7, we will outline generalizations to variable-coefficient problems. The details will be presented in Chapters 3 and 6.
2.1.
Pure Exponentials as Initial Data
The solution of constant-coefficient Cauchy problems is particularly simple if the initial function is a pure exponential; it can be written down in terms of the symbol of the differential operator. The behaviour of the symbol for large wave-numbers will determine whether or not the Cauchy problem is well-posed.
2.1.1. Introductory Examples We start with some simple examples.
Example 1. equation (2.1.1)
(The simplest equation with wave-solutions.) The differential u ~ ( s t. )
+
UU,.(S,
t ) = 0,
1. E
R,
t _> 0.
(with a given constant a E R) is the simplest hyperbolic equation. Suppose that an initial condition (2.1.2)
ii(z.0)= eLUJ~ ( L L ? ) . x E R.
25
Constant-Coefficient Cduchy Problems
is prescribed at t = 0. Here w E R and f ( d ) E C are constants: the factor f ( w ) is added for later purposes. To solve the equation, we use an ansatz in separated variables,
t)=
(2.1.3)
f/(J.
f?ldrii(d.
t)?
and obtain
iit(u.t ) + iwaii(w. t ) = 0.
i ~ ( d . 0=) f^(d).
The solution of this ordinary initial value problem is
G(w,t ) = f ? - j d q ( d ) . Thus, if the problem (2.1.1), (2.1.2) has a solution of the form (2.1.3), it is necessarily given by ll(l..
t ) = f ? l w ( I - f l tf) (&I.
One easily checks that the above function indeed solves the problem: the solution represents a wave of constant amplitude traveling with speed ( I : for a > 0 or Q < 0 the wave travels to the right or left, respectively.
Example 2. heat equation
(The heat equation.) Another simple equation is the so-called
(it
= til,.
.r E R . f
2 0.
Assuming the same initial condition (2. I .2), we use the same ansatz (2.1.3); the ordinary initial value problem for ir(&, .) reads iil(uJ,
t ) = -d2ii(d. t).
G(d,0 ) = . f ( d ) .
Hence the problem is solved by (2. I .4)
tI(S.
t ) = f+J-LJ2tf(d).
Example 3. (The heat equation in backward time.) If we apply the transformation t + -t to the equation u t = (1, I . t 5 0, we obtain t/f
=
-ti,,
.
.I' E
R . t 2 0.
Proceeding in the same way as above, we find
(2.1.5)
fl(J.
t)=
( P l + i J ? f
as a solution for the initial data (2.1.2).
f(4
26
Initial-Boundary Value Problems and the Navier-Stokes Equations
If IwI is large, the solutions (2.1.4) and (2.1.5) behave completely differently for increasing t: Whereas (2.1.4) decays rapidly, the solution (2.1.5) grows there is no bound on the exponential growth exponentially. For increasing Iw(, rate in time. As stated more precisely below, the Cauchy problem for the heat equation in backward time is ill-posed.
2.1.2.
The Symbol of a Constant-Coefficient Operator
The previous examples can be generalized to systems of constant-coefficient equations in any number of space dimensions. With z = (21, ....x , ~ E) R" we denote the space variable. A Notutions. multi-index v is a vector with nonnegative integers as components: v = (24,. .. ,v,s), vJ E {0,1.2.. ..}.
Its order is IvI = vI
+ . . . + v,s.
Each multi-index v determines a differential expression
Furthermore, we use the following basic notations: for w : z E R",
(w.x) =
c
wJzJ;
j=l
for u , u E CfL, I1
(u,.) = p j u j ,
Ill1
=
(21,
u)?
J=I
If A E C".ILis a matrix, then its norm is defined by
JAl = rnax(lAu1, IuI = 1 ) . If H I ,H2 E C".ILare Hermitian matrices, then
H I 5 H2
if and only if
Consider a differential equation
( u , H ~ u5) ( U . H ~ U ) for all u E C".
27
Constant-Coefficient Cauchy Problems
with constant matrices A,, E C''*'l and assume an initial condition U ( X , 0)
(2.1.7)
= e 2 ( w . p ) f ( w ) . z E R",
where w E R" and f ( w ) E C'l are fixed. The unknown solution
takes values in C". A basic observation is
and therefore
P(d/dz)e'("'.')f(w) =
C
A,,(zwl)"' . . . ( ~ w , ) ~ ' e" ' f((~w ) .
Iu I 5 171
Thus, application of the differential operator P ( d / d ~to) eL(w ' ) f ( ~ )results in multiplication by the matrix P(zw):=
C
A , , ( z w I ) ~. '. . (zw,)".
I,,I
This matrix P(zw), which is formally obtained by substitution of zwJ for a/dx,, is called the symbol of the differential operator P ( d / d z ) . We show
Lemma 2.1.1.
The initial value problem (2.1.6),(2.1.7) has the solution u(s, t ) = ez(w..r) P(rw)f
e
(2.1.8)
Proof.
* fb).
The ansatz u(s,t ) = e l ( w . l ) a ( dt. )
leads to
a&, t ) = P(iw)C(w,t ) .
a(W.
0) = f(w).
This ordinary initial value problem has the solution
C(w,t ) = e P ( z w ) t f ( w ' ) , and the formula (2.1.8) is obtained.
28
Initial-Boundary Value Problems and the Navier-Stokes Equations
2.1.3. Well-Posedness in Terms of the Symbol Thus far we have considered only initial data of the form
u(x,0) = el(w.z)f(w); i.e., the spatial behaviour of the initial function is essentially determined by a single wave-vector w E R”;the constant vector f(w) E C” only allows us to multiply ez(w,z)by different constants in different components. If more general initial data f(x) are given, we can try to write these as (2.1.9) where (2.1.10)
e-z(t‘J..c)
f(z)dx,
w E R”:
is the Fourier transform of f(x). (See Section 2.2 for more details.) According to Lemma 2.1.1, the evolution of each individual term of the integrand of (2.1.9), eL(w.s)fl(w). w fixed,
is known, and it is tempting to believe that
describes the evolution to general data f(x). This formula expresses the principle ofsuperposition. Indeed, as we will discuss in Section 2.2, this process is often justified. However, it is also clear that there might be serious convergence problems if leP(iw’tI
is unbounded for IwI + 03. We want to give here an operational definition of the well-posedness of the Cauchy problem ~t
(2.1.1 1)
= P(d/dz)u,
u(z,O) = f<.>,
x E R”, t 2 0
x E R”
in terms of the symbols P(iw). The definition is operational in the sense of providing conditions which can be checked in applications. In Section 2.2 we will show that this definition of well-posedness is equivalent to another one which might be more familiar, namely that
29
Constant-Coefficient Cauchy Problems
(i) for all initial data f in a certain class there is a unique solution in a certain class; (ii) the solution depends continuously on f with respect to certain norms. The operational definition is
DeJinition 1. The Cauchy problem (2.1.1 1) is called well-posed if there are constants a , K such that IeP(zw)tI
5 I<e"'
for all t 2 0 and all w E R". 2.1.4.
Examples of Well-Posed and of Ill-Posed Problems
Let us illustrate the previous definition by some examples.
Example 4. (The wave equation as a hyperbolic system*.) The wave equation y t t = yss leads to the system (2.1.12)
i).
uLt=Auz, A = ( ;
XER, t>O,
if one introduces the variables u1 = yt, u2 = ys. There is a unitary transformation U such that U A U * = ( I0
-1O )
Therefore,
(
P ( i w ) = i d A = U* i; 0
-?d
) u,
and thus lep(iw)I = 1. According to Definition 1, the Cauchy problem for (2.1.12) is well-posed. Also note that the change of variables v = Uu reduces (2.1.12) to
we obtain two uncoupled scalar equations of the form discussed in Example 1.
Example 5.
A so-called weakly hyperbolic system is given by
*The notion of a hyperbolic system will be introduced below.
30
Initial-Boundary Value Problems and the Navier-Stokes Equations
Here eP(zw)t
= ,-t
zwt
1 iwt (0 1 ) .
-
leP(bw)tI e - t ( l
+ (wit).
Thus the problem is ill-posed since the term Iw(t is not bounded independently of w. The growth of leP(iw)t)with increasing IwI is much less severe here than in the backward heat equation, where leP(iw)tI= ewzt. In fact, the problem of Example 5 is weakly well-posed, which is defined as follows: The Cauchy problem (2.1.1 1) is called weakly well-posed if Dejnition 2. there are constants cr, K, q such that
(eP(zw)I5 ~ ( +1IW1q)ent for all t 2 0 and all w E R".
In Section 2.2 we will discuss the difficulties involved with weak wellposedness: If a problem is only weakly well-posed but not well-posed, then a perturbation by a lower-order term can make the problem ill-posed in any sense; this makes it hard to go over to variable-coefficient problems. Hyperbolic systems in ID. Consider a first-order system (2.1.13)
Ut
x E R, t 2 0,
= Au,,
where A E C7L,n. We show The Cauchy problem for (2.1.13) is well-posed if and only if Theorem 2.1.2. all eigenvalues of A are real and A has a complete set of eigenvectors.
Proof. First assume that the eigenvalues of A are real and that there is a complete set of eigenvectors. There is a matrix S with S - A S = diag (A I , . . . ,
A j E R.
) =: A,
From A = SAS-' one obtains that l e P( i w ) t l = leZwAt1
= ISeiwAtS-'1
5
~s~Is-'~,
since JeiwAtI= 1. Theestimate of Definition 1 holds with cr = 0, K = ISllS-'l. Conversely, assume the problem is well-posed. Let A=a+ib,
a , b ~ R ,
Constant-Coefficient Cauchy Problems
31
denote an eigenvalue of A. We must show b = 0. Since e L d A tis an eigenvalue of eP(iw)t,we obtain
Clearly, if b E R. b # 0, we cannot have a bound by K e C kindependent f of w. This shows that b = 0, i.e., that the eigenvalues of A are real. Now suppose that A does not have a complete set of eigenvectors, and let
/A
1
denote a (nontrivial) Jordan block of the Jordan matrix J of A. Then
If J = S-lAS, then
in contradiction to the existence of a bound by Ke"t independent of w. A first-order system ut = AuZ for which the Cauchy problem Definition 3. is well-posed is called strongly hyperbolic.
For first-order systems in any number of space dimensions, we will define strong hyperbolicity in the same way, namely by requesting well-posedness of the Cauchy problem. In Section 2.4 we will give an algebraic characterization generalizing the previous theorem. Solution formula. Suppose ut = Au, is strongly hyperbolic, and S-'AS = A = diag(A,). If one introduces new variables u by Su = u, then one obtains the diagonal system vt = Av,, which is decomposed into n scalar equations. An initial condition u ( x ,0) = e 7 W Z f ( w )
transforms to u ( x . 0 ) = ezwxjj(w), ~ j j ( w = ) f(w)
32
Initial-Boundary Value Problems and the Navier-Stokes Equations
Thus
and therefore I1
t )=
~ ( 2 .
e'w(S+XJ')
$1
(w)Sj t
J=I
where S, denotes the j-th column of S. This shows that u ( z ,t) is a sum of n waves which travel with the so-called characteristic speeds - X i , . . . . -k1.
Parabolic systems in ID. We restrict ourselves here to second-order systems
ut = Au,,
+ Bu, + C U ,
x E R, t 2 0,
where A, B , C E CrL-.".
Dejnition 4. The above system is called parabolic if the eigenvalues XI,. . . , A, of A satisfy ReXj > O , Clearly, the heat equation ut = u,, Definition 1 and show
Theorem 2.1.3. well-posed.
j = 1 ,..., n.
is a simple example. We want to apply
The Cauchy problem for- a second-order parabolic system is
Proof. 1. By Schur's Theorem (Appendix 1) we can transform A by a unitary matrix U to upper-triangular form,
If D = diag (1, d , . . . , dPL-I):d
> 0, denotes a diagonal matrix, then
D U A U * D - ~=
33
Constant-Coefficient Cauchy Problems
Therefore, if we choose d
SAS-'
> 0 sufficiently large and set S = DU, then XI + XI U12/d ...
+ (SAKI)* =
L
&12/d
'.. A,,
+
XI1
1
2 6I.
The reason is that A, + A, 2 26 > 0, and if d > 0 is sufficiently large, then the influence of the outer-diagonal entries is as small as we please. We define the positive definite Hermitian matrix H = S*Sand rewrite the above matrix inequality as
H A + A*H = S * S A + A*S*S = S * ( S A S - ' + S * - ' A * S * ) S 2 6 H . 2. Now consider the symbol
P(iw) = - w 2 A
+ i w B + C.
We obtain
HP(iw)
+ P*(iw)HI: -w26H + const ((wl+ l ) H 5 2aH, .
with a independent of w
To finish the proof of the theorem, we prove a lemma on matrix exponentials eP'. It can be applied to each symbol P = P(iw) separately.
Lemma 2.1.4.
Let P E C'L-'L, and let 1
-I
Ii
If H P
+ P*H 5 2aH.
CL
5H E
= H*
5 h-I, h' > 0.
R,then
1ePt( I K e f y t , t 2 0.
Proof. Suppose that y(t) solves the initial value problem
34
Initial-Boundary Value Problems and the Navier-Stokes Equations
Integration yields*
Mt), Hy(t))
I e20t(yo,
yo).
Therefore, 1
-Ilv(t)l2 K
I
H y ( t ) ) L e2at(yo,Hyo) 5 e20tKlyo12.
Hence we have shown that for all yo, IePtyo12 5 ~ ~ e ~ ~ ~ 1 y ~ / 0 1 ~ ,
and the lemma is proved.
2.2.
Discussion of Concepts of Well-Posedness
In this section we introduce the space Mo of all functions f = f ( z )whose Fourier transforms are CM-smooth and have compact support. If an initial condition u(z,O) = f(z), f E Mo, is given, then the Cauchy problem for any constant-coefficient operator P = P ( d / d z ) is solvable, and the solution is unique within a certain class. For example, we can solve the backward heat equation for initial data in Mo. Well-posedness of the Cauchy problem means more, namely an estimate of the L2-norm of the solution at all later times by the L2-nom-1of the initial data. We will prove that such an estimate is possible if and only if the problem is well-posed according to the definition (using the symbol) given in the previous section. One can weaken the concept of well-posedness and allow derivative-terms of the initial function f for estimates of the L2-norm of the solution at later times. Again, this concept of weak well-posedness can be characterized in terms of estimates for the symbol P(iw). However, if a problem is only weakly wellposed, then perturbations of the differential operator P = P ( d / d z ) by suitable lower-order terms will lead to arbitrarily fast exponential explosion, and the perturbed problem is ill-posed in any sense. We will illustrate this result by an example.
2.2.1.
Solution for Smooth Initial Data via Fourier Transform
The space Mo. Let C e denote the space of all functions 4 : R" 4 C" which have derivatives of all orders and have compact support; i.e., each 4 E C r vanishes outside a bounded set in R'; the bounded set will depend on 4. By *See Lemma 3.1. I for a simple result on differential inequalities, which we are using here.
35
Constant-Coefficient Cauchy Problems
Mo we denote the space of all functions f : RS + C'&which can be written in the form* 4(w)dw,
(2.2.1)
4E
cr.
One easily shows that f E Coo,and one can differentiate under the integral sign since 4 has compact support: 1
D"f(z) = ___ Also, for f E
(iwl)"' . .. (iw,)"sei("~")~(w) dw.
Mo the Fourier transform f ( w ) is defined, and
Therefore, the representation (2.2. I ) is nothing but the Fourier representation off. For a function f : R" -+ C" we say that f E Lz if x -+ I f(z)I2is (Lebesgue-) integrable over R".On L2 one defines an inner product and a norm by (f7.9) = ~ p ) , g ( z ) ) d s , llfll = ( f , f > ' / 2 ,
f , 9 E L2.
We remind the reader of Parseval's relation
( f , d = (f,S), llfll = IIPII. Here we will need this relation only for functions f , g E Mo. (One can show that the space Mo is dense in L2. Then f -+ f is a densely defined bounded linear operator from Mo c L2 +. L2, and one can obtain the Fourier transform f^ E L2 for any f E Ll by continuous extension; see Theorem 2.2.4 below. With this extension, Parseval's relation becomes valid for all f , g E L2.)
Solution formula. Consider the Cauchy problem
(2.2.4) u(z,O)= f(x), z E R", where f E Mo; thus
*The integral is defined componentwise.
36
Initial-Boundary Value Problems and the Navier-Stokes Equations
Since a solution of the differential equation for initial data e z ( w , xf(w), )
wfixed,
is given by ,i(w..r)
eP(iw)t
f(w),
it follows that (2.2.5)
solves the given Cauchy problem. The reason is that the boundedness of the support of f ensures that we can differentiate under the integral sign. Before we can state a uniqueness result, we must make the concept o f a solution more precise. A convenient concept* is the following:
Definition
1.
A function u = u ( x , t) is called Mo-solution of (2.2.3). (2.2.4)
if (i) u ( . ,t) E Mo for all t 2 0; (ii) the function C(w,t) is continuous, and C(w, t) = 0 for IwI ' h independent of t;
> A' with some
(iii) u is a classical solution; i.e., ut exists and u satisfies (2.2.1), (2.2.2) at each point x E RS,t 2 0.
We prove:
Lemma 2.2.1.
For any f E Mo the Cauchy problem (2.2.3), (2.2.4) has a unique Mo-solution. It is given by (2.2.5).
Proof. It is easy to show that (2.2.5) is an Mo-solution; thus it remains to prove uniqueness. To this end, assume that u is an arbitrary Mo-solution and note that U'(Z, t ) =
1
P ( d / d x ) u ( x t, ) = (27r)"/2
A,
ei("'")P(iw)Q(w, t ) dw.
Integration in t yields 1
u ( z ,t ) - f ( x ) = -
I'
ei(".")P(iw)
C(w, T)dr dw.
*We do not aim for generality here, but merely want to illustrate that one can obtain existence and uniqueness results for ill-posed problems, too. The esrimofes are essential for well-posedness.
37
Constant-Coefficient Cduchy Problems
Since the Fourier representation of u ( z .t ) - f ( z ) is unique, it follows that
I’
q w . t ) - f ( w ) = P(iw)
G(w, 7 )d r .
Therefore, &(w,
t ) = P ( i w ) Q ( wt, ) ,
C(w,O) = f @ ) ,
and we obtain G(w, t ) = e P ( 7 4 t f ( w ) .
This shows that
IL
has the representation (2.2.5),and uniqueness is proved.
Solution operator. The solution formula (2.2.5) shows that u ( . , t ) lies in Mo at each later time, and u(.,t ) depends linearly on f . Thus we obtain linear operators So(t) : Mo --+ Mo which assign to the initial data u(.,O) = f the solution
74.. t ) = So(t)f at time t 2 0. Instead of determining u(.,t ) directly from u(.,O) we can first determine
u(.,t l ) = SO(tl)4.,0). 0 5
tl
I t,
and use u(..t l ) as new initial data to calculate u(.,t). We have
So(t)u(.,0) = SO(t - tl )So(t1)74..0). Thus the one-parameter family {So(t). t 2 0} of linear operators on Mo has the properties: 1. So(0) = I ; 2. SO(tl t2) = SO(t2)SO(tl).
+
One says that the family {So(t),t 2 0) forms a semigroup on Mo.
2.2.2. Estimates of the Solution by the Initial Data If (2.2.3), (2.2.4) shall describe the evolution of a physical process, it is reasonable to require that the solutions are stable with respect to perturbations of the initial data, i.e., if u(z,t ) is the solution of v t = P(d/dz)rr with perturbed initial data
38
Initial-Boundary Value Problems and the Navier-Stokes Equations
then we must be able to estimate U(X,t )- u(x,t) in terms of 9. Linearity of the equation implies that such an estimate is possible if and only if one can estimate any solution u(., t) in terms of its initial data u(., 0) = f . In this section we want to show how such estimates are related to bounds of the symbol P(iw). Basically, the results follow from Parseval's relation. Throughout we denote by u = u(x,t)the Mo-solution of (2.2.3), (2.2.4) for initial data f E Mo. If the problem is well-posed; i.e., if
I < Keat,
(2.2.6)
leP(zw)t -
w E R", t 2 0,
then (2.2.5) and Parseval's relation yield
IM.,t)ll = IIeP(iw)tf(w)II5 Keatllfll = KeatI)f 11. In this way, we have an estimate of u at all later times by the initial data. The converse is also valid. Theorem 2.2.2. Given a constant-coeficient operator P(a/dx).For any real K , CY the following conditions are equivalent: 1. The symbols satisfy (2.2.6). 2. For all u(.,O) = f E Mo it holds that
Proof. It remains to show that (2) implies (I). To this end, let t 2 0 and wo E R" be fixed. There is a vector u E C", 1211 = 1, with
I
leP(iwo)t = leP(iwo)t
For 6
4.
> 0, define the function f ( w ) by
fw = { 0 21
(To be precise, we must approximate there is 6 > 0 with
,.
( l e P ( i w ) tf(w)ll
if Iw - wol 5 S, otherwise.
f by functions in
2 (1 - €1lep(iwo)tIll
C r . ) For any
f ll.
Using (2.2.5), we obtain
Keatllfll 2 Since E
I I U ( . ,t)ll
= IleP(iw)tf(w)ll 2 ( 1 - E ) leP(iwo)tlllf
> 0 was arbitrary, the estimate of the symbol follows.
II.
E
>0
39
Constant-Coefficient Cauchy Problems
Now we allow derivative-terms of f to bound the solution at later times. For q = 0, 1 2,. . . define
IIflEfq
=
cIIrfl121 f
E Mo;
bl5q
i.e.,
11 . ( ( H measures ~ all derivatives of order _< q.
By Parseval’s relation,
thus
There is a constant c = cg independent of 1
-( 1 C
+ IW/~)’
5
c
cc
with
w;”‘. ..w;”“5 c( 1 + 1
~ 1 ~ ) ’ ~ w E R”.
I”ISY
Using this inequality, one obtains a characterization of weak well-posedness.
Theorem 2.2.3. Given a constant-coeffrcient operator P(d/dxj; let q E { 1,2, . . .} and cr E R. Thefollowing conditions are equivalent: 1. There is Kl with (2.2.7)
p
W
)
t
1< - Kl (1 + (w(’”~‘‘,
u E R”, t
2 0.
2. There is K2 with
Ilu(.,t)ll I
1i-2 en‘‘
IlfllHV,
t 2 0.
for all u(.,O) = f E Mo.
To summarize, we can distinguish equations u i = P ( d / d x ) uof three different types. Accordingly, the Cauchy problem is 1. well-posed: the solutions satisfy I(u(.,t)ll 5 Keat ~ ~ u ( ~ , O ) ~ ~ ; 2. weakly well-posed hut not of type 1: the solutions satisfy
(2.2.8)
IM., t>Il L KeatIIu(.,O>llHq
for some positive integer q but not for q = 0; 3. not weakly well-posed the symbols ( e P ( z w1)grow t faster than any polynomial in (w(. We say, there is exponential explosion and call the problem ill-posed in any sense.
40
Initial-Boundary Value Problems and the Navier-Stokes Equations
Problems of type 1 or 2 can usually be treated with standard numerical methods. (Higher-order methods might be necessary for type 2 problems.) Since numerical calculations introduce round-off errors - which correspond to high wave-number oscillations - there is no hope to calculate solutions of type 3 problems with standard methods. (Admitting a data error and requesting additional restrictions for the solution, one can regularize ill-posed problems, however.) From this perspective, type l and type 2 problems are both adequate for applications. However, if one wants to go over to variable coefficients, then the concept of weak well-posedness leads to serious difficulties. These will be illustrated by the next two examples.
2.2.3. A Perturbation Leading to Exponential Explosion Recall that Example 5 of Section 2.1.4 is weakly well-posed but not well-posed. If we add the zero-order term
then the equation becomes (2.2.9)
ut=(;
++(-’ - 1
-1’)..
Here the symbol
P(iw) =
(
= iw
-
iw-1
-1
iw+1 iw-1
)
has the eigenvalues 61.2
1
+ J-(l + iw).
Hence, for large IwI,there is an eigenvalue with real part ReK:
N
1~1’’~.
The Fourier transforms
q w ,t ) = eP(iw)tf^(w) of the solutions can grow like elwl”’t, and there is exponential explosion. This demonstrates that the estimate (2.2.7) with q = 1 is not invariant under perturbations by lower-order terms of the equation. One can prove that this example is typical: If the solutions of a given differ1, but not with q = 0, ential equation satisfy an estimate (2.2.7) with some q
>
41
Constant-Coefficient Cauchy Problems
then one can perturb the equation by a lower-order term such that the perturbed system shows exponential explosion.
2.2.4. Variability of Coefficients Corresponds to Perturbations The system (2.2.9) can also serve as an example that variability ofcoeffrrients is related to adding lower-order terms. Consider ut = A(t)w, - U .
L
E
R,
t 2 0.
where
A(t)= U ( t )
-cost
sin t
If one freezes A ( t ) at an arbitrary t = to, then one obtains a constant-coefficient equation, which behaves like Example 5, Section 2.1.4. Thus, for all frozencoefficient problems one cannot estimate the Lz-norm of the solution by the L2-not-m of u(.,O). but one can estimate the L2-norm of the solution as in (2.2.8) with q = 1. Now let us discuss the given variable-coefficient problem. The transformed function P(L,
t ) = u-l(t)U ( X . t )
satisfies the constant-coefficient equation
discussed above. Thus the ,wequation can show arbitrarily fast exponential growth, and - transforming back - the same holds for the given u-equation. Summarizing, to allow estimates of Ilu(.t)lJ ! as in (2.2.8) with q 2 1 is not useful if variable-coefficient problems are to be treated via localization.
2.2.5. *Extension of the Solution Operator Sdt) Up to this point we have only allowed initial data in Mo. We shall now extend the admissible initial data to all functions f E L2 provided the initial value problem is well-posed. To this end, let f E L2 be given. There is a sequence f j E Mo with
*This section might be omitted on first reading. We will use - without proof - completeness of the space Lz and density of Mo in Lz. Since Cox is dense in L? (mollification). the latter result can be shown by Fourier transformation.
42
Initial-Boundary Value Problems and the Navier-Stokes Equations
From
it follows that the sequence t. Also. the limit
u j ( . ,t)
= So(t)f, converges in L2 for every fixed
u(.,t) := lim So(t)f, 3-m
does not depend on the specific choice of the approximating sequence fJ E Mo is another sequence with f, -+ f , then IISo(t)f, - SO(t)f]II
I KeU'IIf, - f II
+
f3:
If
0.
Hence, the construction defines a unique function u(.,t) E L2 for given initial data f E L2:
lim
j'3c
The function u is called the generalized solution of the initial value problem (2.2.3), (2.2.4). We write
u ( . , t )= S ( t ) f , S ( t ) : L2
-+
L2,
and call the one parameter family { S ( t ) !t 2 0) the semigroup of generalized solution operators. For fixed t , the above construction is nothing but the usual extension of a densely defined bounded linear operator to the whole space. With arguments as given above one can prove the following theorem of functional analysis:
Theorem 2.2.4. Let B1. B2 denote normed spaces, let M denote a dense subspace of B1, and let B2 be complete. If So : M -+ B2 is a bounded linear operator, then there is a unique bounded linear operator S : B1 + B2 with S f = So f for all .f E M . The operator S is called the extension of So. By our construction, the generalized solution u(z, t) is just an L2-function with respect to IC for each fixed t. It is often possible, however, to obtain smoothness properties of u ( z ,t) with respect to z and t by further investigations. Let us consider two simple examples.
Example I .
Consider the differential equation
Constant-Coefficient Cauchy Problems
FIGURE 2.2. I .
43
Discontinuous initial function.
with initial data U(Z,O)
= f(s)=
1 for (1.15 1, 0 for 1x1 > 1.
We write f(x) in the form
f(.)
1 =-
elWJf^(iJ)dLJ, f^(LJ)
=
-
, y l W J
ds
and approximate f by 1
fJ(IC)
+J
J, e’”r!(d)dd.
=(27r),/2
(The functions fJhave Fourier transforms fJwith compact support. The piecewise smooth function fj can be approximated with arbitrary accuracy by functions in CF.) For the solution with initial data fI it holds that
and therefore u(z,t ) = lim u J ( z ,t ) = lim f J ( x - t) = f(s - t ) . 1-m
J-m
Hence, the generalized solution consists of the box traveling with speed 1 to the right. Here u is not smooth, but at least t --t u(.,t) E L2 is continuous.
Example 2. Consider the heat equation Ut
= u,,
subject to the initial condition given in Example I . Here we obtain
44
Initial-Boundary Value Problems and the Navier-Stokes Equations
X
FIGURE 2.2.2.
Smooth approximation.
Hence, in any interval 0 < 6 5 t to
< 00 the sequence uj(x,t ) converges uniformly
In this case, the generalized solution is a C"=-function for x E R: t > 0, which satisfies the differential equation in the classical (i.e., pointwise) sense for t > 0. The discontinuities of the initial data disappear for t > 0. This behavior is typical for parabolic equations.
2.3. Algebraic Characterization of Well-Posedness According to Definition 1, Section 2.1, the Cauchy problem for a constantcoefficient system uf = P ( d / a s ) is well-posed if and only if there is cy E R such that
<
I & P ( i w ) - n l ) f1-h-
with K independent of w E R" and t 2 0. Thus, for fixed a , one has to consider the set of matrices
F = { A = A(w)= P ( ~ w-)(I.I : w E R"} and establish a uniform bound of the matrix exponentials: (eAtl 5
K.
I< independent of A E F and t 2 0.
In the main result of this section, Theorem 2.3.2 below, we will characterize the validity of such an estimate by other algebraic conditions. The case of a single mahix. first.
A simple result on matrix exponentials is shown
45
Constant-Coefficient Cauchy Problems
Lemma 2.3.1.
For any A E C"3" the following conditions are equivalent:
1 5 K for all t 2 0. 1. There is a constant K such that 2. All eigenvalues K of the matrix A have a real part Re K 5 0. Furthermore, if J , is a Jordan block of the Jordan matrix J = SAS-I which corresponds to an eigenvalue K with ReK = 0, then J,. has dimension 1 x 1. (In other words, i f K is an eigenvalue with Re K = 0, then the dimension of its eigenspace equals the multiplicity of K as a root of the characteristic polynomial of A . ) Proof. First note that
Also, if
is an arbitrary Jordan block, then the exponential e J r t stays bounded for t 2 0 if and only if either Re K < 0 or (Re K = 0 and J,. has dimension 1 x 1). Thus the result follows.
The Matrix Theorem and its proof. Let F denote an infinite set of matrices A E C7"". The uniform boundedness
5 K , K independent of A
2 0.
E F and t
is not as easily discussed. It is not sufficient to request condition 2 of the previous lemma for each A E F separately because IS-IIISI can depend on A and can become arbitrarily large. The characterization given next is useful if one wants to derive necessary and sufficient conditions for well-posedness.
Theorem 2.3.2. Let F denote a set of matrices A E Cn.71.The following four conditions are equivalent: 1. There is a constant K I with leAt I 5 K I for all A E F and all t 2 0. 2. For all A E F and all s E C with Re s > 0 the matrix A - s I is nonsingular, and there is a constant K2 such that (2.3.1)
sI)-'l 5
K 2 -.Re s
A E F,
Res
(This condition is known as the Resolvent Condition.)
> 0.
46
Initial-Boundary Value Problems and the Navier-Stokes Equations
3. There are constants K3l K32 with the following properg: For each A E F there is a transformation S = S ( A )with
Is-ll+ IS1 5 K3l
(2.3.2)
such that SAS-I is upper triangular,
the diagonal is ordered, 0 2 ReKl 2 ReK2 2
(2.3.4)
... 2 ReKT,,
and the upper diagonal elements satisfy the estimate
(2.3.5)
lbijl
5 K 3 2 ( R e ~ i I ~1 5 i < j 5 n.
4. There is a positive constant K4 with thefollowing property: For each A E F there exists a Hermitian matrix H = H ( A ) with
K i lI 5 H 5
K4
I and HA + A*H 5 0.
For our applications, the most interesting implication is (4) + (1). It allows us to show well-posedness by constructing a suitable Hermitian matrix H = H ( w ) for each symbol P(iw). This part of the Matrix Theorem follows immediately from Lemma 2.1.4. The only difficult part in the proof of the theorem is to show (2) + (3). This part will only be used to show necessary conditions for well-posedness, and its proof might be omitted on a first reading.
Proof of Theorem 2.3.2. (1)
We show the implications 3 (2)
=+ (3)
* (4) * (1)
“ ( 1 ) + (2)”: If A E F then l e n t ] 5 K1 for all t 2 0, thus by Lemma 2.3.1 all eigenvalues K of A have a real part Re K 5 0. Therefore, if Re s > 0, the matrix A - SI is nonsingular and m
( A - sI)-I = Furthermore,
This shows that (2) holds with K2 = Kl.
e(A-d)t
dt.
47
Constant-Coefficient Cauchy Problems
"(2) + (3)": For any matrix A E C"." there is a unitary transformation U such that U A U - ' is upper triangular; the ordering of the diagonal entries can also be prescribed. This is Schur's Theorem, see Appendix 1. Since unitary transformations do not change the Resolvent Condition (2.3. l ) , it is no restriction to assume that the matrices A E F already have the form
It suffices to show the following lemma by induction on n.
Lemma 2.3.3. Given a set F of matrices A E C"." of the form (2.3.6) w>hich satisfy the Resolvent Condition (2.3.l), there are constants K31. K.72 depending only on TI and K2 which have the following property: For each A E F there is a transformation S = S ( A )of the form
+
with I S1 IS-' I 5 K ~such I that the transformed matrin- SAS-I (see (2.3.3)) fullfills the estimates (2.3.5). Proof. The statement of the lemma is obvious for ri = 1. To simplify the induction step below, we first consider the case n = 2. Thus let
We want to transform A to
( (All for any matrix n J , and that Note that ( m l J 5
Hence assumption (2.3.1) yields the bound --a12
Ii2
I (ril - S ) ( K Z - -9)' < - Res'
Re s
> 0.
48
Initial-Boundary Value Problems and the Navier-Stokes Equations
which we can rewrite as
For s
-+
-El, one obtains that
If K ~ + I C I = 0, we do not have to transform A . Thus we define the transformation matrix
where
and obtain
Here lh21
= 21-dIRe~1) I~K~IR~KII
+
by (2.3.7). A bound IS1 IS-'( 5 Z<31 also follows from IyI I 2Zi2, and the result of the lemma is shown for n = 2 .
Now let n 2 3, and assume the statement of the lemma is true for all sets of matrices of order 71 - 1. Let F denote the given set of ri by tt matices A of the form described above. Any A E F can be partitioned as
Since ( A - sZ)-' is of the form
the Resolvent Condition (2.3.1) also holds for the set of n - 1 by 11 - 1 matrices { A l , A E F}. By the induction hypothesis, there are constants K;,.Z<$? depending only on n and 1<2 - and transformations
49
Constant-Coefficient Cauchy Problems
with
IS1 + [S-Il 5
such that the transformed matrix
satisfies the estimates
With
we transform the matrix A itself and find
Except for the last column, the elements of A' are known to satisfy the desired estimates. The set of matrices { A ' . A E F} again fulfills the Resolvent Condition:
I(A' - sI)-'I
lii
=
J ( S I A S r l- sI)-'I 5 ~ S ~ ~ ~- S sI)-'I ~ l5 ~-. ~ ( A Re s
We partition A' in the form
As before, we can apply the induction hypothesis to the matrices transformations S' = S ' ( A i ) with
&4;and find
50
Initial-Boundary Value Problems and the Navier-Stokes Equations
Here
Furthermore, = a;S’-l.
(a’,’2,.’.
Using the upper-triangular form of S‘-’ and the fact that the elements of
except a { , Lhave already been estimated (see (2.3.8)), we also have that
IU’,’~~ 5 h F ~ 2 ~ R e n l ~1, 5 j 5 71. - 1. Except for u’,’,, , all outer-diagonal entries of A” are known to satisfy the desired estimates. We now apply an additional transformation of the form A”’ = S3A”S;1 with
&=I-?
(; ‘1 :::
1
. .
... 0 0 (2.3.9)
= ___ u’r~ 6 1 +El
for
n,
+zI # 0,
y =o
for n,L+ X I = 0.
This is motivated by the 2 by 2 case discussed above. Note that
and that
51
Constant-Coefficient Cauchy Problems aY2
...
2yRen.1
+
if XI n,, # 0.
So A”S; I =
71
It remains to prove an inequality of the form
layrLlI const
+ nlLI
in order to bound y. To this end, note that A” satisfies again the resolvent condition,
I(; I(A” - sI)-] I 5 - for Re s > 0. Re s Let (A”
-
sI)-’ = ( c i j ) , and compute q l rby Cramer’s rule:
{n 71
lCl7rI
=
i= I
=
{fi i= I
with
and
To treat D2, we can use the proven estimates
and find
52
Initial-Boundary Value Problems and the Navier-Stokes Equations
Therefore,
As in the 2 by 2 case we let s
+ --dl
and obtain the bound
This gives a uniform estimate for the quantity y defined in (2.3.9) and ends the proof of Lemma 2.3.3. Hence the implication “2. + 3.” of Theorem 2.3.2 is proved. We proceed with the proof of the theorem. “3. + 4.”: Let A E F be arbitrary and let S = S ( A ) be determined as in 3.; 1.e..
Define a diagonal matrix (2.3.10)
D = diag ( 1 , d, d 2 ,. . . , dn-’),
d 2 1,
and set
C = DBD-I = (DS)A(DS)-’; thus
53
Constant-Coefficient Cauchy Problems
+
As a consequence, let us show that the Hermitian matrix C C* is negative definite, if d = d(n,K32) is sufficiently large. The i-th row of C C* reads
. . -~
( C I ~ , ? ~ .~ ,, ~
- 1 ,2Re ~ . K,, cl,,+l,.
+
. . ,c L r l ) .
Using the ordering 0 2 ReKl 2 . . . 2 ReKrb,we find that the sum of the absolute values of the outer-diagonal elements in the i-th row of C C* is bounded by
+
(71
- I)d-'K321Rerczl.
Thus, by Gerschgorin's Circle Theorem, all eigenvalues of C itive if
+ C* are nonpos-
Now set SI = DS, where D is defined in (2.3.10) and d fulfills the estimate above. The Hermitian matrix
H = H ( A ) = S;Sl satisfies
[HI 5 (SIIS*110125 K4.
IH-11 5
Is-1IIs*-15IK4.
Furthermore,
HA
+ A'H
+ A*S;SI = S;(SIASF1 + S;-'A*S;)Sl = s;(c+ C * ) S ]5 0, = S;SlA
and condition 4 is proved. "(4) + (1)": This implication follows immediately from Lemma 2.1.4 with a = 0. Thus we have proved Theorem 2.3.2.
Applications to the question of well-posedness. Let us note two simple implications of the theorem. As before, we consider the Cauchy problem for a constant-coefficient system ?it = P ( a / d r ) u . The problem is well-posed if and only if there are constants 0 , K E R with
54
Initial-Boundary Value Problems and the Navier-Stokes Equations
Ie(P (2w)-u1)t I < - K
for all w E R" and all t 2 0.
This holds if and only if for each w E R" there is a Hermitian matrix H ( w ) E C"," with
KLII 5 H(W) 5 K4I, H ( w ) ( P ( i w )- a r )
+ (P*(iW)
-
a l ) H ( w ) 5 o>
where K4 does not depend on w. For later reference we summarize this result:
Corollary 2.3.4. The Cauchy problem for ut = P ( d / d x ) u is well-posed if and only iffor each w E R" there is a Hermitian matrix H ( w ) E C"7" with
K L ' I 5 H ( w ) 5 K4I and H ( w ) P ( i w )+ P * ( i w ) H ( w )5 2 a H ( w ) , where K4 and a are independent of w.
Let us note again that the "difficult" part of the Matrix Theorem is only needed to ensure the existence of H ( w ) for a well-posed problem. The converse result,
namely that the existence of H ( u ) implies well-posedness, is elementary and follows immediately from Lemma 2.1.4. In another application of the Matrix Theorem we show that well-posedness does not depend on the zero-order term. (This result should be compared with the example in Section 2.2.3, which demonstrated that weak well-posedness does depend on the zero-order term.)
Lemma 2.3.5. Let P ( d / d x ) denote a constant-coefficient operator, let B E C",", and let Po(d/dx) = P ( d / d x )+ B. The Cauchy problem is well-posed for u t = Pu if and only i f it is well-posedfor ut = Pou. Proof. Assume that the Cauchy problem is well-posed for ut = Pu; thus H(w)P(iw)
+ P'(iw)N(w) 5 2 a H ( w ) .
Here we use the notations of Corollary 2.3.4. Consequently,
+ + ( P * ( i w )+ B * ) H ( w )5 2cyH(w) + H ( w ) B + B * H ( w ) 5 2 a H ( w ) + (1 BI + 1 B'I) K41
H ( w ) ( P ( i w ) B)
I (2a
+ (IBI + IB*l)K i } H ( w ) .
Another application of Corollary 2.3.4 shows the well-posedness of the Cauchy problem for Po = P + B.
55
Constant-Coefficient Cauchy Problems
Remark. Suppose that the matrices H ( w ) are constructed for a given operator P ( d / d x ) . Then the above corollary shows the well-posedness of u t = Pu Bzl for any matrix B. To obtain this result, only the elementary part 4. + 1. of the Matrix Theorem is needed.
+
2.4. Hyperbolic and Parabolic Systems In this section we define strong hyperbolicity and parabolicity for constantcoefficient equations in any number of space dimensions. The Cauchy problem for these equations is well-posed. As an application, we consider the compressible Euler equations linearized at a constant flow. One obtains a system which is strongly hyperbolic if d r / d p > 0, where p = r ( p ) is the equation of state. If one adds viscosity, i.e., goes over to the Navier-Stokes equations, then the linearized system is neither parabolic nor hyperbolic, but “almost” parabolic. This motivates us to treat certain mixed systems in Section 2.5; these can be considered as coupled hyperbolic-parabolic equations. 2.4.1.
Hyperbolic Systems
Consider a first-order equation in
.$
space dimensions,
We want to characterize all equations of the above form for which the Cauchy problem is well-posed. Note that the symbol S
P(iw) = i x w J A , .
w E R”.
]=I
depends in a linear way on the length Iwl of w : for u/ # 0, we set ~ j = ‘ u//lwl and obtain P ( i u ) = IwlP(iw’). This simple observation and Theorem 2.3.2 lead to
The Cauchy problem for the first-order equation (2.4.1) is Theorem 2.4.1. well-posed if and only if the foliowing hvo conditions hold: 1. For all w’ E R”. Iw’I = 1, all eigenvalues of P(iw’) are purely imaginary. 2 . There is a constant h-31, and for each J E R”. ( u / ’ ( = I , there is a transformation S(w‘) with
(S(J’)I
+ (S-’(w’)( I
11-31
56
Initial-Boundary Value Problems and the Navier-Stokes Equations
such that the transformed matrix
has diagonal form. Proof. First assume conditions ( 1 ) and (2) to hold. For w matrix
# 0, the
diagonal
has purely imaginary entries. Therefore, J e P ( 4 f )5
KiI J e 1 4 A ( w ' ) l 1 = Ki,.
Thus the problem is well-posed. (The wave-vector w' = 0 has the symbol P(0)= 0 which causes no problem for well-posedness.) Now assume conversely that the problem is well-posed, and let a
+ ib.
a, b E
R.
denote an eigenvalue of P(iw'). We first show that a = 0. The matrix P(iw).w = IwIw',has the eigenvalue Iwl(a + ib) with real part u ~ w I . If a > 0 then
cannot be bounded by Ice"' with O , h*independent of w . If a < 0 then we consider P(-ilwlu'), and also arrive at a contradiction. This shows that all eigenvahes of P(iw') are purely imaginary. To prove the second condition, note that well-posedness yields
with some K . a independent of w and t
We fix t' = lult and obtain for le"')''
2 0.
Therefore,
(w'( + m,
I< -
I<.
t' 2 0.
Now we apply Theorem 2.3.2 to the set of matrices
P(1w').
w' E
R'.
Id1 = 1 ,
57
Constant-Coefficient Cauchy Problems
and use condition 3. of that theorem. Since we have already shown that Re K = 0 for the eigenvalues K of P(iw’), the estimate (2.3.5) implies that S P ( i J ) S - ’ is diagonal. This finishes the proof of the theorem.
Concepts of hyperbolicity. Theorem 2.4.1 characterizes those first-order (constant-coefficient) equations for which the Cauchy problem is well-posed. These equations ut = Pu are called strongly hyperbolic. The definition of other concepts of hyperbolicity, which play a role in applications, is summarized in
De3nition I .
A first-order equation uUt= P(i)/i)s)uwith Y
,=I
J
is called: weakly hyperbolic if for all w E R” all eigenvalues of P(iw) are purely imaginary; strongly hyperbolic if the conditions of Theorem 2.4.1 are met; symmetric hyperbolic if A, = AJ. j = 1 . . . . s ; strictly hyperbolic if for all w E R“,w # 0, all eigenvalues of P ( i w ) are purely imaginary and distinct. ’
As we have seen, the Cauchy problem for a weakly hyperbolic equation is generally not well-posed. In the case of a symmetric hyperbolic equation, the symbol has the form P(iw) = i C w J A J with a Hermitian matrix CLJ~A,. Therefore, P(iw) can be diagonalized by a unitury transformation, and the Cauchy problem is well-posed. If the equation is strictly hyperbolic, then there is a complete set of eigenvectors for P(iw’). Iw’I = 1, and the eigenvectors can be chosen as analytic functions of w”. If S - ’ ( d )contains the eigenvectors as columns, then S(w’)P(iw’)S-’(w‘) is diagonal, and one obtains a bound
+ p-l(w’)l
(S(w’)l
I A-31.
Consequently, strictly hyperbolic equations are strongly hyperbolic, and the Cauchy problem is well-posed.
No exponential growth. The solutions of a strongly hyperbolic system (2.4.1) (without zero-order term) do not show any exponential growth: For each w there is a transformation S = S(w)such that SP(iw)S-’ = A is diagonal with purely imaginary entries. Thus, for the Hermitian matrix H = S*Sit holds that
58
Initial-Boundary Value Problems and the Navier-Stokes Equations
H P ( i w ) + P * ( i w ) H = S*SP(iw)+ P*(iw)S*S =
s*{sP(iw)s-'+ s*-'P*(iw)s*}s
= S*{A + A * } S = 0.
Lemma 2.1.4 applies with o = 0, and therefore leP(iw)tI5 K. Here K is independent of w and of t 2 0. For later reference we formulate an algebraic result, which summarizes a part of the above considerations.
Lemma 2.4.2. lent:
For each A E C"." the following two conditions are equiva-
I . The eigenvalues of A are real, and A has a complete set of eigenvectors. 2 . There exists a positive definite Hermitian matrix H with H A = A* H .
Proof. First assume that ( I ) holds and set P = i A . There is S such that SPS-' is diagonal with purely imaginary entries. We define H = S*S and obtain, as above, 0 =H P
+ P*H = i ( H A- A*H).
Conversely, let H A = A * H . H = H * H112= ( H ' l 2 ) * and , obtain
> 0. We can write H
= H'f2H'/2:
H 1 / 2 A H - 1 / 2= H - ' / 2 A * H 1 / = 2 H1/2AH-1/2)*.
(
For the Hermitian matrix H ' / 2 A H - 1 / 2there is a unitary matrix U such that
U f f ' / 2 A H - ' / 2 U *=. D is real diagonal. Consequently, if we set S = U H ' 1 2 , then S A S - ' = D , and ( I ) is shown.
Smoothness of H(w). For general strongly hyperbolic systems, the matrices H = H ( w ) with H P ( i w ) + P * ( i w ) H = 0 cannot be chosen as globally smooth functions of w # 0. This leads to technical difficulties if one wants to go over to variable coefficients. We will comment on this further in Section 3.3.1 below. Of course, if the system is symmetric hyperbolic, then P ( i w ) P*(iw) = 0, and one can choose H ( w ) = I. Also in the strictly hyperbolic case the matrix H ( w ) can be chosen as a smooth function of w # 0, because the eigenvectors of P(iw) depend smoothly on the matrix elements. However, strictly hyperbolic systems hardly ever appear in applications. One can prove, for example, that a
+
59
Constant-Coefficient Cauchy Problems
strictly hyperbolic system in three space variables must have at least dimension n = 7.
2.4.2. The Compressible Euler Equations Linearized at Constant Flow The full equations without forcing read
D Dt
p -u
D Dt
+ gradp = 0,
-p
+ pdiv u = 0,
p = r(p),
where
D 8 8 _ - - + uDt dt dx
+
Ll-
8 + u,-d 8% dz
Let U = (U,V ,W), R, P denote a constant state of u, p: p with P = r(R); i.e., U, R, P are independent of x and t. With - supposedly small - corrections u’, p’: p’ we substitute the ansatz
u=U+U’,
p=R+p’:
p=P+p’
into the above equations; after neglecting all terms which are quadratic in the corrections we obtain the linear equations
D Dt
R - u‘
+ gradp‘ = 0.
D Dt
- p‘
+ Rdivu‘ = 0.
dr p’ = -(R)p’. df
where D I D t denotes now the constant-coefficient operator
D Dt
d dt
- =-
d d + u-dn: + v-ddy + W--. dz
To simplify the notation, we drop ’ in the expressions for the perturbation terms u’. etc. If we set dr -(R) dP
=: K
and use the equation p = ~p to eliminate the pressure from the momentum equations, we find that
D Dt
-u
+ RPi gradp = 0, -
D Dt
- p + Rdivu = 0.
In matrix form, this first-order system reads
Initial-Boundary Value Problems and the Navier-Stokes Equations
60
U
0
K/R
0
R O O 0
1 / 0 0
U
(2.4.2)
O
R
0
w o o O
0
R
Let us assume K = c2 > 0 . Then the system can be symmetrized by a simple scaling. Using the new variable p = cp /R, we obtain the symmetric hyperbolic system
$j+(s U
u o o c
:o :o u:jg(;j+(: :;;i$(;j v o o o
o c o v
Since this system leads to a well-posed Cauchy problem, the same is true for the equations (2.4.2). The assumption IF
is crucial. If
K
dr
= -(R) = c2 > 0 dP
< 0 then, for example, the matrix
w o o
0 0 0 W K ~ R O R W
o w 0 0
O has the nonreal eigenvalues
w f i&. Hence the system (2.4.2) is not hyperbolic, and the Cauchy problem is ill-posed. For K = 0 the Cauchy problem is ill-posed, too.
61
Constant-Coefficient Cauchy Problems
2.4.3. Parabolic Systems Consider an even-order operator of the form
P ( a / a x )= P27ll(a/dx)
+Q(a/a~).
where
and
PzI,,(d/8s)is called the principle part of P ( d / d x ) . Parabolicity of ut = P ( d / d z ) u is defined in terms of the principle part of P as follows: The equation ut = P ( d / d x ) u is called parabolic if for all Dejinition 2. w E R" the eigenvalues ~cj(w), j = 1 l . . . , n, of PzlIL(iw)satisfy ReKj(w) 5
(2.4.3) with some 6
- ~ I W ) ~ " ~ j, = l , . . .
1
n,
> 0 independent of w.
A simple but important example is the equation ut = Au with the Laplacian
Here P2(iw) = -(w;
Theorem 2.4.3. is well-posed.
+ . . . + w:),and one can take 6 = 1. We show
The Cauchy problem for a parabolic system ut = P ( d / d x ) u
Proof. The proof proceeds along the same lines as the proof of Theorem 2.1.3; the Matrix Theorem is not needed. First consider the operator P~,(d/ax) with the symbol
Transform P271,(iw')to upper-triangular form by a unitary matrix U = U(w'):
62
Initial-Boundary Value Problems and the Navier-Stokes Equations
The elements of P2rrL(i~'), Jw'J= 1, are uniformly bounded; therefore, for some constant K it holds that lbjkl
=
Jbjk(W')l
1 5j
5 K,
< k 5 71..
The parabolicity assumption yields Rer;j(w')
5 -6,
We set D = diag ( 1 , d, . .. , d " - l ) , d large d, SP2&w')S-I
j =l,...,~.
> 0, S = DU, and obtain, for sufficiently
+ (SP2m(iw')S-l)*
5 -61.
Here d can be chosen independently of w',Iw'J = 1. As in the proof of Theorem 2.1.3, we set H = H(w') = S*S. Then
+
~ ~ ( i w~ )* ( i w5) -SJU~*"H ~
+ const(lw12m-' + 1
)
5 ~2 a ~ ,
and the result follows from Lemma 2.1.4. Roughly speaking, in the present context of well-posedness, the main feature of parabolic equations is the following: The dissipativity of the principle part - which is expressed by the estimate (2.4.3) - will force all high wave-number components ei(w,z),Iw(large, to decay in time, no matter what the lower-order terms of P ( d / d z ) look like. The formal analog in the above proof is that we can dominate the term const(Jw12m-'+ 1) by 61~1~"if IwI is sufficiently large.
2.5. Mixed Systems and the Compressible N-S Equations Linearized at Constant Flow The compressible N-S equations without forcing read
D Dt
p-u
+ gradp=P,
D Dt
-p
+ p d i v u = O,
p=r(p),
where
P = pAu
+ ( p + p') grad (div u),
p
> 0,
p'
2 0.
63
Constant-Coefficient Cauchy Problems
As in Section 2.4.2, we let U = (U, V,W ) ,R, P denote a constant state with P = r ( R ) and use an ansatz as described in 2.4.2. Neglecting all terms which are quadratic in the corrections, we find linear equations for u’. p‘, p’. Again, we drop ’ in the notation and eliminate the pressure using p = Kp,
K
=
dr
-(lo. dP
As a result, we obtain the linear constant-coefficient equations
D + K grad p = UAU+ ( u + u’) grad ( div u), Dt R D --p+ Rdivu=O. Dt These read in matrix form -u
u = p/R,
Y’ =
p‘/R,
Here D I = d/b’x, etc. The matrices A I , A 2 , A 3 can be read off From (2.4.2). Let us denote the second-order operator on the right side of the above equation by PZ = PZ(d/aX); thus P 2 acts on (u, u,w, P ) ~ Obviously, . the symbol
Pz(iw), w = ( w I , wz, w3), has 0 as an eigenvalue. The reason is that the continuity equation does not contain a second-order term. Consequently, the above system is not parabolic. We now rewrite the above system in block form and separate the momentum equations from the continuity equation:
(2.5.1)
64
Initial-Boundary Value Problems and the Navier-Stokes Equations
The second-order operator P2 acts only on u, not on (u, p). Let us show that ut = P2u is parabolic. The symbol is real and symmetric; it reads This Page Intentionally Left Blank w: wIw2 wIw3
0
0
1 1 1 0
0
0
0
w3
For any y E R3 it holds that
= -vlwl2IYl2 - (v
+ v')b-JlYl + W2Y2 + W3Y3I2 I -vlwl2IYl2.
It follows that all eigenvalues of the matrix P2(iw) are 5 - ~ l w 1 ~ .Hence, according to Definition 2, Section 2.4.3, the equation ut = P2u is parabolic. To study the full linear system for (u, p ) given above, we consider the system in its block form,
0 PI)(:)+(;;:
p2
"at( " )P= ( o
R;2)(:).
Here PI is the first-order scalar operator
as can be read off from (2.5.1). Clearly, the scalar equation pt = PIP(with real coefficients) is strongly hyperbolic. The operators Rij are of order one. Their precise form will not be important for the discussion. Since both P2 and PI lead to well-posed Cauchy problems, it is clear that the Cauchy problem for the completely uncoupled system "(u)
at
P
=
("
0
P 0I )
(;)
is also well-posed. We want to show that the coupling term
does not destroy well-posedness. This follows from the result proved in the next theorem, where we consider a slightly more general situation. It might be
65
Constant-CoefficientCauchy Problems
worth while to note again that - on the Fourier side - the discussion is purely algebraic; the relevant estimate for the coupling term becomes quite transparent.
Theorem 2.5.1.
Consider vector functions
where u ( x , t ) has m components and ~ ( xt ), has n components. Let P = P(a/ax)denote a constant-coefficient differential operator whose corresponding block form is
Assume that u t = P ~ IisL second-order parabolic, that vt = Plv is first-order strongly hyperbolic, that the RJk are of order one, and that & is of order zero. Then the Cauchy problem for w t= P(d/dx)ul is well-posed.
Proof. We can assume that P2 coincides with its principle part. With suitable constants 6 > 0: Ii4 > 0 and suitable Hermitian matrices Hl(w).H2(w) we have, for all w E R",
+ -S(W)21, HI ( W ) P I (iw)+ P;(iw)HI (w)= 0. H2(W)PdiW) P;(iW)H,(w) 5
Iii'I 5
HI(^), ~ 2 ( w5)
KJ.
We define the Hermitian matrix
and consider the quadratic form belonging to
+
Q ( w ) := N(ul)P(iw) P * ( i w ) H ( u ) . For all .il E C"', 5 E C", all w E R",and some constant K it holds that
66
Initial-Boundary Value Problems and the Navier-Stokes Equations
For any two real numbers a, b we know that 2ab 5 a2 1
21Wll.Cillal = 2Elw#l;lal
5
+ b 2 , and therefore, 1
E21W121.Ci12
+ -#E12!
E
> 0.
Using this inequality, we amve at the estimate r.h.s.
K
K I
2
2 E
5 -61~1~).Ci1~ + -~~1w1~1.Cil~ + -1)612
+ K(wllQ(2+ K{Iii12+ IGl’}.
If we choose c2 = 6 / K then
r.h.s. 5
s { ---Iwl2
K 1 + Klwl}l.Ci12 + 11412 + K { l.CiI2 + 1612}. 2E
2 Hence, with some constant K I independent of w ,6 , .i, it holds that
and therefore,
Q(w) I KII I KIK4H(w). Now well-posedness follows from Corollary 2.3.4.
2.6. Properties of Constant-Coefficient Equations As mentioned previously, the switching between a variable-coefficient problem and the constant-coefficient equations obtained by freezing coefficients introduces lower-order terms. Thus, it is natural to ask which constant-coefficient equations can be perturbed by arbitrary lower-order terms without destroying well-posedness. We shall show that only strongly hyperbolic and parabolic systems have this property. (Of course, for other equations, a restricted class of perturbing lower-order terms might not destroy well-posedness.) Another technically important result of this section can be described as follows: If the Cauchy problem for ut = P(a/dz)u is well-posed, then one can construct an inner product and a norm
(u, U ) H = ( u ,Hv),
IIulItf = (u,H d ’ 2 ,
such that (2.6.1)
11u(’,t ) l l H I eat I I ’ d . , O ) l l H .
In other words, the estimate of Theorem 2.2.2, which expresses well-posedness, holds with K = 1 if we replace the L2-norm by 11 1 ) ~ . If one uses the L2-norm only, then - in general - a constant K > 1 is required; however, if this is the
67
Constant-Coefficient Cauchy Problems
case, the solution-estimate becomes locally (in time) useless: it does not even express continuity in time. Therefore, the construction of norms )I JIH with property (2.6. I ) is important if one wants to treat variable-coefficient problems by localization. Furthermore, we will establish Duhamel’s Principle for inhomogeneousequations Ut
= P(d/dx)u
+ F ( x , t).
2.6.1. Perturbation by Lower-Order Terms and Well-Posedness Consider the Cauchy problem for a system (2.6.2)
ut = P(d/dx)u,
P = P,,,
+ Q,
where
If the principle part P, is of first order and strongly hyperbolic or of even order and parabolic, then the Cauchy problem for P = P, Q is well-posed, no matter what the lower-order terms Q look like. For the strongly hyperbolic case the operator Q is of order zero, and the result follows from Lemma 2.3.5; the parabolic case has been treated in Theorem 2.4.3. We show the following converse:
+
Theorem 2.6.1. Consider the Cauchy problem for (2.6.2) with some fuced principle part P,,,, and assume it is well-posed for any choice of the lower-order terms Q. Then either m = 1 and (2.6.2) is strongly hyperbolic or m is even and (2.6.2) is parabolic. Proof. For m = 1, strong hyperbolicity and well-posedness are the same; see Theorem 2.4.1 and the definition following the theorem. Thus we can assume m 2 2 and must show that m is even and (2.6.2) is parabolic. First assume m 2 3 to be odd. We show that the real parts of the eigenvalues of P,,(iw)are zero. Since the Cauchy problem is well-posed for Q = 0, we have (2.6.3)
I < Keat.
lePm(iw)t -
K denote an eigenvalue of P,(Zw’). Then Prn(iu)has J u J nasl ~ an eigenvalue and (since m is odd) P,(-iw) has - l w l r r l ~as an eigenvalue. The estimate (2.6.3) implies that Re K. = 0.
As before, let w = (w( w’,(w’( = 1, and let
68
Initial-Boundary Value Problems and the Navier-Stokes Equations
Now let
thus
+
P(iw) = P,,(iw) w;r. The real part of each eigenvalue of P(iw) equals w:. This function of w is unbounded, and therefore the Cauchy problem for P cannot be well-posed. Second, assume that m is even, but ut = P,,,u is not parabolic. Let ~j(w’) denote the eigenvalues of PmL(iw’), Iw’I = 1. The function max Re
K~(w’)
3
depends continuously on w’, and if ut = P,,u is not parabolic, then there exists a vector 77, 1171 = 1, and an eigenvalue ~ ( 7 7 ) of Pl,L(iq)with (2.6.4)
Re ~ ( 7 7 )2 0.
Let
the symbol of P = P,
+ Q reads
For the wave-vectors
where 17 is chosen with (2.6.4), the real parts of the eigenvalues of P(iw) cannot be bounded. This contradicts well-posedness.
2.6.2. Symmetrization and Energy Norms Suppose that the Cauchy problem for ut = P(d/dz)u is well-posed where P is a general constant-coefficient operator; see (2.2.3). There are constants a and K with
69
Constant-Coefficient Cauchy Problems
According to the Matrix Theorem 2.3.2, one can construct Hermitian matrices H ( w ) with
Here K4 > 0 is independent of w E R". Using these matrices, we define the linear (pseudo-differential) operator H mapping L2 into L2 by
(The symbol P ( i w ) depends analytically on w,and an examination of the constructive proof of the Matrix Theorem shows that H ( w ) can be chosen as piecewise smooth. Therefore, the above integral exists for u E Mo. For general u E Lz, the image Hu can be obtained by the usual extension process; see Theorem 2.2.4.) The operator H is used to define an inner product and a norm by
( u ,V ) H = (u, H.rJ),
Theorem 2.6.2.
II2
1 1 4 H = (71. 4 H
.
The constructed norm is equivalent to the L2-norm; i.e.,
I~;lllullz 5 IIUII'H I K411412. Furthermore, if u(x, t ) denotes a (Mo or generalized) solution of the Cauchy problem f o r ut = P u , then
Proof. With Parseval's relation one finds that
and similarly ( u ,Hu) 2 K;' ll~11~.
70
Initial-Boundary Value Problems and the Navier-Stokes Equations
The following equations hold for any Mo-solution u = u(z, t): d dt
- ( 4 z ,t ) ,Hu(z, t ) ) = ( ~ ( 5t ),,W z , t ) ) + ( 4 2 ,t ) ,Hut(z, t ) ) = ( P u b ,0 ,W z , t ) )
+ ( u b ,t ) ,H Pu ( z , t ) )
= (P(iw).;(w,t ) ,H ( W ) f i ( W , t,)
+ (qw,t ) ,H(w)P(iw)Q(w,t ) ) =
(?qw, t), (H(w)P(iw)+ P’(iw)H(w))Q(w,t ) )
< 2a(Q(w,t ) ,H(w).Ci(w,t ) ) = 2a(u(z,t ) ,Hu(x, t ) ) . Thus the solution-estimate follows. For general initial data u(.,O) E L2, the result follows by approximation. The inner product ( u ,V ) H is called an energy inner product for P = P ( d / d z ) and (1 I(H is called an energy norm. The transformation by H ( w ) in Fourier space is called symmetrization. The above proof shows that the operator P satisfies the following estimate for all sufficiently smooth functions w = w ( z ) , u~E L2:
( w ;pw)H
+ ( p w ,w)H 5 2 d w , w)H
For this reason the operator P is called semibounded w.r.t. the inner product (., . ) H . With this definition we can summarize our result in the following way.
Theorem 2.6.3. The Cauchy problem for ut = P(d/dx)u is well-posed if and only i f the operator P is semibounded w.r.t. an inner product (., . ) H which corresponds to a norm equivalent to the L2-norm. The above construction of the operator H is important in the general theory of partial differential equations. Many proofs concerning the well-posedness of linear problems with variable coefficients proceed technically by constructing suitable inner products such that the differential operators with frozen coefficients become semibounded. For the Navier-Stokes equations one can generally work with the usual Lz-inner product.
2.6.3.
Inhomogeneous Systems: Duhamel’s Principle
We start with an ordinary initial value problem (2.6.5)
u’(t) = A(t)u(t)+ F ( t ) , t 2 0, ~ ( 0=) U O .
71
Constant-Coefficient Cauchy Problems
Here A ( t ) E C"." and F ( t ) E CTLare assumed to be continuous in t. For any T 2 0 consider the homogeneous system
~ ' ( t=) A(t)v(t), t 2 The solution depends linearly on
U(T)
T.
= UO.
thus we can write
VO;
v ( t ) = S ( t ,T ) V o . t 2
T.
This defines the solution operator S ( ~ , TE) C'".". Duhamel's principle for (2.6.5) states
Lemma 2.6.4.
The solution of the inhomogeneous system (2.6.5) is given by
6'
~ ( t=) S ( ~ , O ) U+O
(2.6.6)
S(t,T ) F ( T ) ~ T .
Proof. By definition of the solution operator S(t. T ) we have that d A(t)S(t.T ) V ~= A(t)v(t)= ~ ' ( = t ) - S(t,T ) U O , dt and therefore d
-
at
S ( t ,T ) = A(t)S(t,7).
Since S ( t ,t) = I, we find, by differentiation of (2.6.6),
~ ' ( t=) A(t)S(t,O)UO +
A(t)S(t:T ) F ( TdT )
+ F(t)
+ F(t).
= A(t)u(t)
This proves the lemma. Consider a Cauchy problem ~t
(2.6.7)
+
= P ( d / d ~ ) u F ( x :t ) ,
4 x 1 0) = f(.>,
x E R",
t 2 0,
x E R", f E L2,
and assume the problem is well-posed for F = 0. The homogeneous system Ztt V(X, T )
=P(d/dz)~,x E = !AX),
R", t 2 7,
x E R", g E L2,
is solved by a(., t ) = S(t - T ) g 7
72
Initial-Boundary Value Problems and the Navier-Stokes Equations
where S(<)is the generalized solution operator defined in Section 2.2.5. Then Duhamel’s principle states that (2.6.7) is solved by (2.6.8) On the right-hand side, one has to integrate the Lz-valued function T 4 S(t - r ) F ( . ,T ) from T = 0 to T = t. With a proper concept of a generalized solution and a proper definition of the integral, one can indeed prove formula (2.6.8) under mild assumptions on F. We will restrict ourselves here to Mosolutions (see Section 2.2.1) and assume that i) f E Mo; ii) F(., t) E Mo for all t >_ 0; iii) the function P(w,t ) is continuous, and some K independent of t.
E(w, t)
= 0 for IwI
>K
with
Then Fourier transformation yields
&(w,t ) = P ( i W ) C ( W , t ) + P(w, t ) , q w ,0 ) = f(W). By Duhamel’s principle for ordinary differential equations, Lemma 2.6.4, nt
Transforming back, we obtain ~T E ,R ” , t 2 0. (2.6.9) u ( z , ~=) {So(t)f}(LC)+ { S ~ ( ~ - T ) F ( . , T ) } ( Z ) z
J’,
Here we have changed the order of integration in our assumptions on F. If we now define
2
and t ; this is justified under
as denoting the integral on the right-hand side of (2.6.9), we can drop the variable z in (2.6.9) and write the equality of functions
Thus we have shown Duhamel’s principle (2.6.8) under our restrictive assumptions.
73
Constant-Coefficient Cauchy Problems
We can also derive solution-estimates for inhomogeneous equations. Let ( . , . ) H denote an inner product which makes P semibounded, and let 11 I I H denote the corresponding norm. Under the same assumptions on f and F as above, Ilu(., t ) l l H
5 err'l l f l l H
+
I'
llF(',r ) l l H d r
More general data f and F can be treated by approximation. It is not difficult to deduce that
for 0 1. t 5 T. An inequality of the above type will be used below as the definition of well-posedness for problems with variable coefficients.
2.7. The Spatially Periodic Cauchy Problem: A Summary for Variable Coefficients Thus far we have assumed a constant-coefficient operator and initial data on the whole space. The purpose of this section is to state briefly the corresponding results for the spatially periodic case. For constant coefficients, the proofs could be given as above simply by replacing Fourier transforms with Fourier expansions. For later reference we state definitions and results for variable-coefficient equations. The proofs are carried out in Chapter 3 for one space dimension and in Sections 6.1 and 6.2 for more than one space dimension. In the last section of this chapter we present two counterexamples to a naive localization principle.
2.7.1.
Solution Concept and Well-Posedness
A function u = u ( x ) , z E R",is I-periodic in the 3-th coordinate if u ( z ) = U(Z
+ e 3 ) for all z E R",
e3 = ( 0 , .. . , 0 , 1,0,. . . . 0),
1 in coordinate j .
We call I) = u ( z ) , x E R", 1-periodic in z if u is 1-periodic in each coordinate x J ?j = 1. . . . , s. Also, a function ~ ( xt), is called 1-periodic in z if z + U(Z, t) is I-periodic in 5 for each fixed t. These functions are also called I-periodic, for short; we will not deal with periodicity in time.
74
Initial-Boundary Value Problems and the Navier-Stokes Equations
If u , u : R" 4 C" are Cm-functions which are I-periodic in z, then their Lz-inner product and norm are defined by
We refer to the following problem as the spatially periodic Cauchy problem. Suppose that
are C"-functions of their arguments, which are 1-periodic in z. We try to find a C"-solution u = u ( z ,t) of ut = P(x,t , 6'ldiC)u
=
+ F ( x ,t )
A , ( z , t)D"u
+ F ( z ,t ) , z E R",
t 2 0,
I45m U(Z,0) = f(z),x
E R",
which is 1-periodic in z. DeJinifion I . posed if:
The above spatially periodic Cauchy problem is called well-
i) for each f = f(z) and each F = F ( z ,t) (satisfying the above conditions) there exists a unique solution u = u(z,t) (satisfying the above conditions); ii) for each T > 0 there is a constant K ( T ) independent of f , F with
If the coefficients A, = A,(x, t) are constant, then one can use the symbol P(iw) to decide the question of well-posedness. Similarly to Theorem 2.2.2, one obtains: The spatially periodic Cauchy problem with a constant-coefficient operator P ( d l 8 z ) is well-posed if and only if there are constants K and a such that sup { IeP(iw)tI: w E R"} 5 Keat for all t 2 0. (One could restrict the components of w to be integer-multiples of 27r. This would not change the possibility of an estimate of the above form, however.)
75
Constant-Coefficient Cauchy Problems
2.7.2. Strongly Hyperbolic and Second-Order Parabolic Equations
Hyperbolic systems. Consider a first-order operator with variable coefficients
We define its symbol by 4
P(z,t,iw) = iCwjA,(r.t).
~j
E R",
Iw'l
= 1.
j=1
Suppose all frozen-coefficient problems 7LU.t
= P(z0,to, d / d r ) v
are strongly hyperbolic as defined in Section 2.4.1. It follows from Lemma 2.4.2 that there is a positive definite Hermitian matrix
H(z0,to. w)= H*(zo,t o , w)> 0 with
+ P * ( X O , to, i w ) H ( x 0 .t o , i w ) = 0.
H(z0,t 0 , w ) P ( X 0 , to, iw)
We define strong hyperbolicity of the variable-coefficient equation S
(2.7.1)
ut = P ( z ,t , d/dz)u
A j ( z ,t ) j=l
dU ~
dXj
as follows:
Definition 2. The equation (2.7.1) is called strongly hyperbolic if there exists a Hermitian matrix function H(z,t,w)>O, x € R S , t > O ,
w E R S , IwI=l,
which is Cm-smooth in all arguments, is 1-periodic in x, and satisfies
H ( z ;t , w ) P ( z ,t , i w ) + P * ( X , t , i w ) H ( x , t , W ) = 0. (If a zero-order term and a forcing function are added in (2.7.1), strong hyperbolicity is defined in the same way.)
The matrix function H ( z , t , w ) is called a symmetrizer. Thus, except for the smoothness and periodicity of the symmetrizer, we have defined strong hyperbolicity by adopting the constant-coefficient concept.
76
Initial-Boundary Value Problems and the Navier-Stokes Equations
The most important cases are symmetric hyperbolic systems, where
A j ( z , t )= A ; ( z , t ) , j = 1,. .. ,s. For such systems the symbol is always antisymmetric, and one can take H = I as the trivial symmetrizer. The hyperbolic systems which occur in the context of the Euler equations are symmetric hyperbolic after a simple transformation of the density; a first example was given already in Section 2.4.2. One can show
Theorem 2.7.1. bolic equation
The spatially periodic Cauchy problem for a strongly hyper-
is well-posed.
For a proof in one space dimension, see Section 3.3.1; for the general case, see Section 6.2. Parabolic systems. Now consider a second-order equation
(2.7.2)
Ut
= P ( z .t , d / d Z ) U
+ F ( z ,t ) ,
where
C A y ( z ,t)D”u.
P ( z ,t , d / d z ) u =
1.112
The principle part of P is
and we define its symbol 4
Let KEy
= K[(Z, t,W),
c = 1 , . . . , 72,
denote the eigenvalues of P.(z.t, iw). Suppose all frozen-coefficient equations of (2.7.2) (with F = 0) are parabolic, as defined in Section 2.4.3. Then, for each fixed (z. t), there is 6(z,t) > 0 with
77
Constant-CoefficientCauchy Problems
Re Ke(x,t,w) 5 -6(x,t) for all w E R“, (w( = 1,
e = 1,. .. , n .
Smoothness and periodicity in x imply that we can choose a uniform 5 = 6(T)> 0 for 0 5 t 5 T . Therefore, the following definition of parabolicity requires nothing but parabolicity of all frozen-coefficient problems. Definition 3. The equation (2.7.2) is called parabolic if for each T is 6(T)> 0 with forallwER”, (wI=1, O I : t 5 T ,
Retcp(z,t,w)l-b(T)
> 0 there
P = l , ..., n.
One can show
Theorem 2.7.2. The spatially periodic Cauchy problem for a second-order parabolic system (2.7.2) is well-posed. This result will be proved in Sections 3.1 and 3.2 for one space dimension and in Section 6.1 for more than one space dimension. If we ignore the requirement of the smoothness of the symmetrizer in the strongly hyperbolic case, we can summarize Theorems 2.7.1, 2.7.2 by saying: for strongly hyperbdlic and second-order parabolic systems the localization principle is valid. These variable-coefficient systems inherit their well-posedness from the frozencoefficient equations. It is not known whether the requirement of smoothness of the symmetrizer in the strongly hyperbolic case is really necessary. In the next section we present two counterexamples to localization for equations which are neither hyperbolic nor parabolic. 2.7.3.
Counterexamples to Localization
Our first example is a 27r-periodic system for which all frozen-coefficient equations are well-posed; the variable-coefficient system is ill-posed nevertheless.
Example I .
Consider the second-order system
ut = iU*(X)
(Q”) U(x)u,,r. 0
7
where U(x) =
cosx -sinz
sinx cosx
For any frozen-coefficient problem
78
Initial-Boundary Value Problems and the Navier-Stokes Equations
we can introduce new variables w := s U ( X O ) V ,
s(;
;)s-1=(;
;).
and obtain
The Cauchy problems for w and for u are well-posed. Now we introduce
t ) = U ( Z ) U ( Z :t )
V(Z>
as a new variable into the given variable-coefficient problem; then we obtain
The system for u has constant coefficients, and therefore we can decide the question of well-posedness. The eigenvalues K I , ~2 of the symbol P(iw) are the solutions of -iaw2 - 2Pw - icr - K -iw2p i- 2aw - ip 0 = det(P(iw) - K ) = det -iYW2 -')'i - K Thus, Re
(Ki
+ K2) = -2Pw,
and consequently the problem is ill-posed for ~9# 0. In the following Schriidinger equation the converse happens: The variablecoefficient problem is well-posed although the problems with frozen coefficients are ill-posed. Example 2.
Consider the scalar equation Ut
+
= ip(2)u3., ip3.(.E)ux
where p ( r ) is a real, smooth 1-periodic function with p ( z ) 2 po Cauchy problem for a frozen-coefficient equation ut = i P ( X O ) ~ , ,
+ iP,(ZO)~,
> 0. The
79
Constant-Coefficient Cauchy Problems
is ill-posed if p . , ( ~ )# 0, because Re (-iP(+J2
- P . P ( . d W ) = -P,(J-o)W
is not bounded from above. We only sketch the proof that the given variablecoefficient equation leads to a well-posed spatially periodic Cauchy problem. The equation can be written as ut = i(PU.r).i".
If we assume that u = u(z, t ) is a smooth I-periodic solution, then d dt
-
(4.. t ) , u ( . ,t ) ) = (ut,u ) f
( u ,U t ) = i{(PU,, u,) - ( U , r P 7 L . r ) } = 0.
Thus we obtain a priori Ilu(..t)ll =
ll~(.,O)Il. t 2 0.
To obtain the existence of a solution, we can consider the parabolic equations Ut
and send
---f
= tll,,
+
Z(pU,r),.
6
> 0,
0. This technique to prove existence is illustrated in Chapter 3.
Notes on Chapter 2 The first paper dealing with the Cauchy problem for general systems of partial differential equations with constant coefficients is due to Petrovskii (1937). He uses Hadamard's (1921) definition of well-posedness, which is equivalent to our definition of weak well-posedness. He proved that the Cauchy problem for ut = P ( ~ / ~ Zis)well-posed V if and only if the eigenvalues K of the symbol P(iw) satisfy an inequality Re n(w) 5 CI log ( 1
+ 1 . ~ 1 ) + C2,
C I ,C, constants.
Later GArding (1951) proved that one can choose CI = 0. The Matrix Theorem is proved in Kreiss (1959); its application to the Cauchy problem is discussed in Kreiss (1963). The latter paper also shows that the Cauchy problem for hyperbolic first-order systems is well-posed if the eigenvalues of P ( i w ) are purely imaginary and their algebraic multiplicity is constant. Our perturbation example in Section 2.2.3 is typical. Yamaguti and Kasahara (1959) have proved the following theorem: If the Cauchy problem for a firstorder system is weakly well-posed for all lower-order perturbations, then it is well-posed. In connection with our counterexamples to localization, W.G.
80
Initial-Boundary Value Problems and the Navier-Stokes Equations
Strang (1966) gave a necessary condition for the well-posedness of Cauchy problems: If the Cauchy problem is well-posed for a system ut = P( z :d/dz)u with z-variable coefficients then the problem is also well-posed for all problems ut = Pm(zo,d/az)u with frozen coefficients. Here P,, denotes the principle part of P.
3
Linear VariableCoefficient Cauchy Problems in 1D
In this chapter we treat second-order parabolic and first-order strongly hyperbolic systems in one space dimension. Instead of considering the Cauchy problem with initial data in L2, we deal with problems which are 1-periodic in s. The periodic problem has the technical advantage that the behavior at s = f c x , need not be specified, but the arguments for initial data in Lz would be essentially the same. Assuming the existence of a smooth solution for the parabolic equation, we first prove estimates of the solution and its derivatives. In Section 3.2 we write down a simple difference scheme and prove analogous estimates for it. By sending the step-size to zero, we obtain a solution for parabolic systems in a rather elementary and constructive way. Strongly hyperbolic equations are treated by adding a small second-order term, whose coefficient is sent to zero. In a similar fashion as in the constant-coefficient case, we also treat certain mixed hyperbolic-parabolic systems and give an application to the linearized N-S equations. In the parabolic case we use as a guiding principle: first, assume the existence of a solution and show estimates for it and its derivatives; second, write down a difference scheme and show analogous estimates which imply the existence of a solution. This principle is very useful for equations of different type, also. We demonstrate this in Section 3.6 with an application to the linearized Korteweg-
81
82
Initial-Boundary Value Problems and the Navier-Stokes Equations
de Vries equation. The linear Schrodinger equation will be treated as a limit of parabolic equations. The estimates derived for the parabolic systems in Section 3.1 are very elementary. They do not express the smoothing property of the parabolic operator. In some applications this smoothing is important, however, and it will be shown in Section 3.2.6. Also, we demonstrate some important properties of strongly hyperbolic systems in Section 3.3: there is a finite speed of propagation, and discontinuities travel along the characteristics.
3.1. A Priori Estimates for Strongly Parabolic Problems We consider a second-order system (3.1.1)
+
ut = A ~ u , , A , U ,
+ Aou + F =: P ( x ,t . d / d ~ ) +u F.
x E R. t 2 0,
together with an initial condition (3.1.2)
u(s.0) = f ( ~ ) .
T
E
R.
The matrices
A, = A J ( x .t ) E C".", j = 0. 1,2. and the vector functions
F = F ( T ,t ) . f = f ( ~ E) C" are assumed to be of class C" for simplicity. It is an essential assumption, however, that all functions are taken as 1-periodic in T for each fixed t. Furthermore, to begin with, we assume that
A ~ ( Tt ),+ A ; ( x . t) 2 261 for all
( 2 ,t).
with 6
> 0 fixed.
This is slightly more restrictive than the assumption of parabolicity for all frozencoefficient problems. If A:! A; satisfies a lower bound of the above form, the equation (3.1.1) is called strongly parabolic. In this section we will assume that u ( z , t ) is a Cm-soldtion of the above problem which is 1-periodic in T for each fixed t. The existence of such a solution will be proven in Section 3.2. Here we will derive estimates for u and its derivatives.
+
Notations. For vectors u . o E C'z and matrices A E C".'zwe remind the reader of the notations
83
Linear Variable-CoefficientCauchy Problems in 1D
For (smooth) 1-periodic vector functions u = u(x),v = v ( x ) our basic innerproduct and norm are
For nonnegative integers p we also use the Sobolev inner-product and norm given by
For (smooth) 1-periodic matrix functions A = A ( x ) let IA(, = rnax{lA(z)( : 0 5 r <_ 1 ) . It will be frequently used that
and similarly that
If u = u(a,t) and v = u ( z , t) are functions of
( u ,V ) = (u(..t ) ,u(., t ) )=
I'
(2, t)
we often abbreviate
( ~ ( rt .) ,U ( Z , t ) )dx,
and thus leave off the arguments to simplify the notation. The main tool we will use is "integration by parts": If 7 ~ .u E C' are 1-periodic, then ( u z !t i ) =
I
I
( u z !u ) da = -
.I'
( u ,v,) d r = -(u,ux).
3.1.1. The Basic Energy Estimate Let T
> 0 denote an arbitrary but fixed time. For 0 5 t 5 T we have
84
Initial-Boundary Value Problems and the Navier-Stokes Equations
I:-2~11~Sll2 + c2{11~llII~zll+ llu1l2+ llFll2). For any two real numbers a. b we know that ab b a2 ab = ( a a ) ( - ) I:-a2 a
2
I ;a2 + i b 2 ; thus for any a # 0, 1 + -b2, 2a2
and therefore,
Choosing a = a(Slc2) > 0 appropriately, we find from (3.1.3) that
(3.1.4)
d -(u, u ) I cg{ llu(I2 llFl12}
+
dt
The derivation shows that
CI
(3.1.5)
for 0 I :t I:T.
, c2, c3 only depend on 6 and on bounds for
IAolca, IAllca, IA2zlca
in the interval 0 I :t 5 T. Using the abbreviations Y(t) =
IM.,t)1I2:
t)Il2, 4 ( t ) = [IF(.>
we have shown the differential inequality
Y’W
I C3Y(t) + c34(t),
0I :t
I T.
Now (a simple version of) Gronwall’s Lemma, formulated next, allows us to estimate y(t).
Linear Variable-Coefficient Cauchy Problems in ID
Lemma 3.1.1.
85
Suppose y E CI[O, TI, $ E C[O,TI satisfy y'(t)
I 4 t ) + ?l(t),
0
I t I Tl
for-some c 2 0. Then
Proof. For the function z ( t ) = e-"';y(t) it holds that
~'(= t ) -ce-'"y(t)
+ e P c t y ' ( t ) 5 e-r'$(t).
Thus integration yields
1 I$(.r)l f
z(t)- 40) I
d7,
and the desired estimate for y ( t ) = e r t z ( t )follows.
An application of this result gives us
Lemma 3.1.2. Let CI denote a constant which hounds the norms (3.1.5) in 0I t 5 T . There is another constant C, which depends only on GI. 5 , and T such that
Proof. If c = c3 denotes the constant in (3.1.4), the result follows from the previous lemma with C2 = eCTmax{ 1 c}.
3.1.2. Estimates for Space-Derivatives of u If we differentiate the given differential equation (3.1.1) with respect to z we find that, for u = u , ~ , ut = uts = A2ucrr
+ A2,ulL,, + A I ~ , +, ~Alx7Lz + AouL,+ Aosu + F,
86
Initial-Boundary Value Problems and the Navier-Stokes Equations
The function u satisfies the initial condition u(x,O) = u,(x,O) = f,(z). Since we have an estimate for llull and thus for G, we can apply the previous lemma and obtain an estimate for v = u,:
in 0 5 t 5 T .
Here C, depends only on 6, on T, and on a bound for IAolm, IAllm, IAj.clm,
j = 0,1,2,
in 0 5 t 5 T. It is obvious that we can proceed in the same way and further obtain estimates for u Z Tu,,,, . etc. Just differentiate the above equation for u = u, with respect to z, etc.
Lemma 3.1.3. Given a positive integer p and a time T > 0, then the solution of (3.1.1)! (3.1.2) satisfies
Here C depends only on p , on T , on 6,and on a bound for the coefficients Aj(x, t ) and their derivatives of order 5 p in 0 5 t 5 T .
3.1.3. Estimates for Time-Derivatives and Mixed Derivatives Using the given differential equation (3.1. I), we can always express time derivatives of u by space derivatives. For example, if the differential equation reads ut = Au,,
+ F,
then differentiation gives us utt =
Aut,i-z
+ -4tu.m + Ft
= AAurzzr
+ 2AA,u,,,
+ AA,,u,,
+ AF,, + Atu,, + Ft.
To express z i t t t . we need six space derivatives of u, four space derivatives of F , two space derivatives of Ft, and the function Ftt. In general, we can express and 2(q - 1 - k ) space q time derivatives of u by 29 space derivatives of derivatives of
ak
- F.
dtk
k=O, ...,q-
1.
87
Linear Variable-Coefficient Cauchy Problems in ID
Further differentiation with respect to 2 allows us to express mixed derivatives of u also. Since the space derivatives of u are already estimated in Lemma 3.I .3,we have
Theorem 3.1.4. Given any nonnegative integers p and q and a time T there is a constant C with
> 0,
in 0 5 t 5 T . The constant C is independent o f f and F , and only depends on 6,on T , and on a bound for the derivatives of the coeflcients Ao. A1 . A2 of order 5 2q p in 0 5 t 5 T . For p = q = 0 one also needs a bound for A2s.
+
3.2. Existence for Parabolic Problems via Difference Approximations In this section we prove existence of a C^-solution U ( I . t ) of the space-periodic initial value problem (3.1.l),(3.1.2).As in Section 3.1, the main assumption is Az(L,t )
+ A;(z, t ) _> 261
for all
(2.t ) .
with 6
> 0 fixed.
We relax this condition in Section 3.2.5, however, where we treat general parabolic problems. All functions are assumed to be I-periodic in L , and the coefficients of the differential equation are assumed to be C*-smooth. First we also assume that the initial function is in C"; general L2-initial data and the smoothing property of parabolic equations are treated in Section 3.2.6. It follows immediately from the basic energy estimate stated in Lemma 3.1.1 that the Cauchy problem (3.1.l),(3.1.2)has at most one classical solution, i.e., at most one solution in C l ( t )n C 2 ( x ) . If there were two solutions u , u then u' = u - L' would be a solution of (3.1.1).(3.1.2)with F E f = 0. Then our basic energy estimate implies w = 0.
3.2.1.
The Main Result and Outline of the Proof
We want to prove the existence of solutions using a difference approximation. For that reason we introduce a gridlength h = 1 / N , N a natural number, gridpoints 5, = vh. v E Z, and gridfunctions with function values ziY := P)(T,) €
C71.
88
Initial-Boundary Value Problems and the Navier-Stokes Equations
We shall always assume that the gridfunctions are I-periodic; i.e., u, = o ~ ~ + , for all u E Z
(note N h = 1).
As usual, the translation operator E is defined by
( E v ) , := u,+I. Clearly, w := Ev is also 1-periodic. The j-th power of E ( j an integer) is
( E J v ) ,= L ' , + ~ .
u E
z.
and we shall use the notation
Eo =: I With the help of the translation operator E , we define the forward and backward divided difference operators D+, D-:
hD+ : = E - I .
(3.2.1)
hD- := I - E-' = hE-ID+;
1.e..
h(D+v), = u , + I
-
v,.
~ ( D - u )= , U , - u,,-I.
The usual second-order accurate approximations to d / d x and d 2 / d x 2are
1 DO= - (D+ D - ) and D+D- = h-2(E - 2 1 E - I ) , 2 respectively. If u = u ( x ) is a smooth function of .T E R, then its restriction to the grid is ( u , ) , , ~ z= ( u ( z , ) ) , ~ z This . gridfunction is also denoted by u, for simplicity. A similar notation applies to matrix functions A = A ( z ) . Often A = A ( x ) will be a 1-periodic matrix function and Au a gridfunction with
(3.2.2)
+
+
function values
(At'), = A(x,,)~(.c,). We need some simple error formulae for the above difference operators. E.g., if we apply the forward difference operator D+ to the restriction of a smooth function u , then Taylor expansion gives us
where
Linear Variable-Coefficient Cauchy Problems in 1 D
89
Correspondingly,
(3.2.4)
where
These error formulae will be applied below. We now describe a simple difference analog of (3. I . l ) , (3.1.2), which we use for our existence argument. Only space is discretized, time is left continuous. The difference analog reads
(3.2.5)
d l ~ , / d t= Az,D+D-v, C,(O)
= fl,,
v E
+ AI.D()O,+ Ao,t), + F,.
v E Z.
z.
The equations (3.2.5) represent an infinite system of ordinary differential equations for ~ ( t=) ( ~ , , ( t ) ) ~subject , ~ z to initial conditions. However, we are only interested in I-periodic solutions and therefore we need to consider (3.2.5) only for v = 0, 1 , 2 , .... N - 1. Using the periodicity conditions
FIGURE
3.2.1. Gridlines for difference scheme.
90
Initial-Boundary Value Problems and the Navier-Stokes Equations
we can eliminate u.v(t) and v - l ( t ) and obtain a system of N differential equaAny solutions (with initial conditions) for the N unknowns v o ( t ) . ...,t j > \ T - l ( t ) . tion of this initial value problem generates the corresponding solution of (3.2.5) by periodic extension. Therefore, the existence of a unique periodic solution of (3.2.5) follows from standard theorems for ordinary differential equations. It is clear that the solution v ( t ) = v h ( t )depends on the step-size h, but we often suppress this in our notation. We are going to show in Section 3.2.3 that we can estimate all differencedifferential quotients D:dquh(t)/dt’J independently of h. Then we shall use a theorem from approximation theory which states that we can interpolate the gridfunction u = v h with respect to T in such a way that the interpolant u ~ ” ( t) T, is as smooth as vh; i.e., we can estimate all derivatives ~ P + ~ u J ~ ( t)/dxJ’dtq z - . in terms of D:dqv”(t)/dtq. The next step is to show that UJ” satisfies (3.1.1). (3.1.2) with F, f replaced by F hFp, f h f f . For h + 0, the functions wh converge to the solution of (3.1. l), (3.1.2).
+
+
3.2.2. The Basic Energy Estimate for the Solutions of the Difference Approximation Before we derive the basic energy estimate for the system (3.2.5), let us first introduce a discrete scalar product and norm and let us establish some simple rules. If u , w are 1-periodic gridfunctions, then we define their discrete scalar product and norm by .\’- I ( v , U’)h :=
wu)h,
( ~ U I
l l ~ l l ~:= L (v.l l ) b ,
The scalar product for gridfunctions has the same general properties as the L2scalar product of functions of a continuous variable; i.e., it is a sesquilinear form, and we have the rules
91
Linear Variable-Coefficient Cauchy Problems in 1 D
Note that
IAlx,/c I max IA(x>I = lA1m is bounded independently of h if A = A ( z ) is a smooth 1-periodic matrix function. Another simple rule is: If A , + A t 2 261 for all v, then
(3.2.6)
(u.( A
+ A*)u)/,2 2611~ll;~
Corresponding to integration by parts, there are rules of summation by parts in the discrete case. For periodic gridfunctions u, w, (V.
D-UJ)/,= -(D+V. 21))h,
(V.
DoZLJ)/~ = -(Doll.
~U)/L.
This is easily checked: A- I
A’- I
v=O
,=O
N
A-2
-1
u=-l
A’- I
N-l
v=O N- I
u=o
The second relation follows from the first. The identity
h ( D + A v ) , = AU+1~,+1- Auu, = A ~ ( v , + I u,)
+ (A,+I
-
Av)uu+~
gives us a discrete analog of Leibniz’ product rule:
D+(A7))= A ( D + v )+ ( D + A ) ( E v ) . Now we can derive the basic energy estimate. The solution v = v A of the system (3.2.5) satisfies
92
Initial-Boundary Value Problems and the Navier-Stokes Equations
where &, satisfies a similar estimate as RQ. Introducing these expressions into (3.2.7) and observing (3.2.6), we obtain an inequality of the same type as for the continuous case, and therefore the following basic energy estimate holds:
Lemma 3.2.1. Let C1 denote a constant which bounds the norms (3.1.5) in 0 I t I T . There is another constant C2 which depends only on CI, 5 , and T such that
3.2.3.
Estimates for Higher Order Divided Differences
As an auxiliary result we first show
Lemma 3.2.2.
For any smooth 1-periodic function g it holds that
Proof. For p = 0 the estimate is true. Assume it is valid up to the order p - 1. Let
We begin with an estimate for w := D+vwhere v is the solution of (3.2.5), as before. Applying D+ to (3.2.5) and using the discrete Leibniz’ rule, we find the following system for w:
93
Linear Variable-Coefficient Cauchy Problems in ID
The system (3.2.8) is of the same form as (3.2.5) and - using Lemma 3.2.2 to estimate coefficients -we obtain an estimate for w = D + v , which is of the same type as for the continuous case. Repeating this process, we obtain estimates for all forward difference quotients DTv. As in the continuous case, we can also differentiate with respect to time and obtain bounds for DTdQv(t)/dtQ. If one introduces the discrete analog of the continuous HP-norm by
C(D:U, P
( u ,u ) ~= ~ . ~ ~D:u),,, J
I I U2 I I ~ =. ~(u, ~ ~u ) h . H p .
=o
one can summarize the result as follows:
Theorem 3.2.3. The estimate of Theorem 3.1.4 holds for u = v" if one replaces the HP-norm by its discrete version. The constant is independent of the step-size h. 3.2.4. Convergence as h
4
0
The following result about Fourier interpolation is proved in Appendix 2.
+
Theorem 3.2.4. Let h = 1/(2m 1) where m is a positive integer. is a 1-periodic gridfunction, then there is a unique Fourier polynomial
c
If v h ( z )
m
w/y2) =
a;e2=tkz, a; E C",
k=-in
which interpolates v h at all gridpoints: Wh(Z,)
= uh(z,), v E
z.
For any p = 0 , 1,2,. . . it holds that
It is remarkable that the constant in the estimate does not depend on h. In our application, the gridfunction d ( z , t) depends smoothly on t . If w h ( z . t ) denotes the Fourier interpolant w.r.t. z, then w" is a C"-function of ( z . t ) since the
94
Initial-Boundary Value Problems and the Navier-Stokes Equations
coefficients a; are C"-functions of t. (This follows from the construction of the interpolant in Appendix 2.) Also, differentiation of wh w.r.t. t gives us the Fourier interpolant of d v h / d t . Therefore, Theorems 3.2.3 and 3.2.4 imply bounds
with constants independent of h. To obtain bounds in maximum norm, the following result - an example of a Sobolev inequality - will be applied. (More general Sobolev inequalities, which we need below, are proved in Appendix 3.)
Lemma 3.2.5.
Suppose u E C1[O,11. Then
Proof. There are points
20, X I with
min{lu(z)l : 0 5 z 5 1) = Iu(zo)(, max{lu(z)I : 0 5 z 5 1 ) = 1u(z,)/= 1~., Let zo
Since
< X I for definiteness. Then
lu(s0)l
5
llull, the result follows.
Using the estimates (3.2.9) and the previous lemma, we obtain bounds for all derivatives of w h ( z ,t) in maximum norm:
with constants independent of h. For short, we say that the family of functions wh is uniformly smooth in each finite time interval. Let us show next that w h ( z ,t) solves the Cauchy problem (3.1.1), (3.1.2) up to terms of order h.
Linear Variable-Coefficient Cauchy Problems in 1 D
95
satisfy estimates
IF,%,t)JI C,
x E
R, 0 5 t 5 T ,
lf/Yz)I 5 C ,
x E
R,
where C does not depend on h. Proof. Let x, I x < x ’ , + I . Then
pI(€,
+ t)d€ =: t ) + hp?(x.t ) = dv,h(t)/dt + hp:(z, t ) , w , h ( ~t,) = Dowh(x,, t ) + h&(z, t ) = Dovi(t) + hpF(zlt ) , w,,(x, t ) = D+D-v,h(t) + h&(x, t ) , d ( z , t ) = wth(xv. t ) 2L1(L(x,,
h
where Jp:(x, t)J 5 const, j = 1,2,3. If we use these expressions to replace w h in the above definition of FF and observe the equation (3.2.5) for v h , then the estimate for FF follows. Also,
and the lemma is proved. Since the family of functions w h = w h ( z l t ) is uniformly smooth in 0 5
t 5 T, we can apply the result of Appendix 4 (which is based on the ArzelaAscoli Theorem) and obtain the following: There is a 1-periodic C”-function u = u ( z , t ) ,z E R, 0 5 t 5 T, and a sequence h = hj 0 such that ---$
as
h=hj-O
for all derivatives dP++g/dxpdt+g. By the previous lemma it follows that u solves the given initial value problem in 0 5 t 5 T. Here T > 0 is arbitrary, and thus we have shown
Theorem 3.2.7. The strongly parabolic initial value problem (3.1.1): (3.1.2) with 1-periodic (in x ) C“-data has a unique C”-solution u = u ( x , t) which is 1-periodic in x .
96
Initial-Boundary Value Problems and the Navier-Stokes Equations
Remark. To obtain existence of a solution u,it was sufficient to establish convergence for some subsequence w h h = hj 4 0, via the Arzela-Ascoli Theorem. In view of numerical applications one might ask, however, whether in general UUI” 4 u as h 4 0. This convergence does indeed hold as follows from the basic energy estimate of Section 3.1.1 applied to the difference w” - u.Actually, the (nonconstructive) Arzela-Ascoli argument can be avoided altogether in an existence proof: From the basic energy estimate it follows that w h is a Cauchy sequence in L2 as h = hj 4 0, and smoothness of the limit function can be deduced from the uniform (in h) decay rate of the Fourier coefficients of wh.Such a uniform rate follows from the uniform smoothness.
3.2.5. General Parabolic Systems Thus far we have considered parabolic systems (3.1.1) under the restriction
We want to replace this by the weaker assumption that all frozen-coefficient problems are parabolic in the sense of the definition given in Section 2.4.3. To this end, we fix T > 0 and assume there exists 6 > 0 independent of z, t with (3.2.10)
Re ti
2 6 > 0 for all eigenvalues K
of A(s,t),
05t
5 T.
(The assumption A2 + A; 2 261 implies Reti 2 6 for all eigenvalues K of A2.) A variable-coefficient problem (3.1.1) satisfying the eigenvalue condition (3.2.10) is called parabolic. The discussion given below of a variable-coefficient problem - via properties of equations with constant coefficients - is very important in a general theory of partial differential equations. Basically the technique is the following: Well-posedness of each constant-coefficientproblem - obtained by freezing coefficients at an arbitrary point P = (so1t o ) - is expressed via the Matrix Theorem in Fourier space. One obtains existence of a certain Hermitian matrix H p for each point P = (z0,to). These matrices H p are used to define time dependent norms I( IIH~~,,which are all equivalent to the L2-norm. Applying 11 J J H (instead ~) of the &-norm, one can again prove the basic energy estimate, where the energy is now measured in the new norm. In the present situation we do not have to rely on the Matrix Theorem to construct Hp. Instead, using the first part of the proof of Theorem 2.1.3, we have
Lemma 3.2.8. Let A denote a constant matrix and let Re K 2 5 > 0 for all eigenvalues ti of A . There exists a Hermitian matrix H = H’ 2 I such that
H A + A’H 2 6H.
Linear Variable-Coefficient Cauchy Problems in 1D
97
Note that the bound H 2 I can be enforced by multiplying H with a scalar, if necessary. We proceed with the construction of the norms 11 I I H ( ~ ) . The idea of the construction is due to GIrding (1953).
Lemma 3.2.9. Under. assumption (3.2.10) there exists a smooth 1-periodic matrix function H ( x . t ) = H * ( x ,t ) 2 I such that H(T.t)A2(5,t )
(3.2.1 1)
The norms
+ A ; ( T .~ ) H ( Tt ). 2 ?6 H ( T . t ) .
1) JIH(~)dejined hy
are equivalent to the L2-norm.
Proof. For each point P = ( T O , t o ) we construct a matrix H p with HpA2(20. t o )
+ A ; ( x ~to)Hp , 26Hp.
H p = H6
2I .
using the previous lemma. By continuity, the point P has a neighborhood N ( P ) with
H p A 2 ( 2 .t )
+ A ; ( T , t ) H p 2 -26H p
for all (x,t) E N ( P ) . By the Heine-Bore1 Theorem there are finitely many points P I , .. . . PJ whose neighborhoods N ( P j ) cover the set (0, I ] x [O. TI, T > 0 being fixed. Choose a partition of unity = 4,(.r.t) of 1-periodic functions subordinate to these neighborhoods:
4j
E Cm, q5]
4j
2 0,
= 1, support qbj contained in N(P,).
3
(To be precise, the Heine-Bore1 Theorem and the Partition of unity argument are being applied to the compact space S' x [O. TI where S1 denotes the circle. Functions on this space are identified with 1-periodic functions.) With the help of the locally supported functions 4J,define the matrix function
and note that
98
Initial-Boundary Value Problems and the Navier-Stokes Equations
The first property ensures that 11 l I ~ ( t is ) equivalent to the L2-norm; the second property implies the estimate (3.2.11) if we sum over j. To illustrate how the basic energy estimate can be obtained under the condition (3.2.10), we consider an equation ut = AIL,,.
We have
Thus the proof of the basic energy estimate can be finished in the same way as above. The other estimates follow similarly. We summarize the result in
Theorem 3.2.10. The spatially periodic Cauchy problem (3.1.1 ), (3.1.2) is well-posed if the system is pointwise parabolic. 3.2.6.
Smoothing Properties of Parabolic Systems
For simplicity we neglect lower-order terms and consider a strongly parabolic system
(3.2.12)
Ut
= Au,,,
A + A * 2 261,
A E C".
If the initial data u(.,O) = f are given in L2, there is a unique generalized solution u since the problem is well-posed. We want to show in this section that u E C" for t > 0 even if the initial data are just in L2 and have no smoothness properties. To show this, we first derive sharper a priori estimates for the solutions to initial data in C". Recall that
This gives us the usual bound for IIu(.,t)JI,which depends only on ~ ~ u ( ~ , O ) ~ ~ . The function 2, = u, satisfies
99
Linear Variable-Coefficient Cauchy Problems in 1 D
and therefore
=
l l ~ z I l 2- 26tllvzll 2 .
Thus
6-
d -dt1 1 ~ 1 1 ~ + -(tv,v) 5 - 2 ~ t ( ( v , 1 1+ ~ dt
Id
constllul(2 5 constllu112.
Integration from 0 to t yields
tl(4.,t)1I2 5 const {
.6'
IM.,7)1I2d.T+ llu(.,0)1l2}.
Hence we have a bound for JIu,(., t)ll which depends only on Ilu(.,0)" and not on /luz(.,O)ll. This process can be continued. We obtain bounds for all expressions t*lJdpu/3xp112which do not depend on derivatives of the initial data, but only on the L2-norm of u(.,0) = f . Now consider the case where the initial data u(.,O) E L2 are not necessarily smooth. We construct the corresponding generalized solution as the limit of regular solutions u(j)(x,t ) with initial data
For 0 < r I t 5 T we find that
Ilm., t)llHP I c, with a constant C independent of j. Similar estimates also hold for all time derivatives of u ( j ) . Using the Sobolev inequality formulated in Lemma 3.2.5, one finds that
This implies smoothness of the limit function u, and we have proven
Theorem 3.2.11.
Consider (3.2.12) with initial data in L2. The corresponding generalized solution is a function belonging to C" for t > 0.
The same result holds for general parabolic systems.
100
Initial-Boundary Value Problems and the Navier-Stokes Equations
3.3. Hyperbolic Systems: Existence and Properties of Solutions In this section we consider linear strongly hyperbolic systems in one space dimension and first show the existence of a unique solution to the spatially periodic Cauchy problem. The principle for obtaining existence is as follows: The addition of a small second-order term to the equations leads to a parabolic system for which the existence of a solution has been shown. We estimate the solutions and their derivatives independently of the coefficient of the secondorder term. Thus we can send the coefficient to zero and obtain a solution of the hyperbolic problem. Furthermore, we show some important properties of hyperbolic systems: There is no smoothing, and information travels with a finite speed. 3.3.1. Symmetric Hyperbolic and Strongly Hyperbolic Systems; General Existence Theorems We consider the Cauchy problem for a hyperbolic system (3.3.1)
Z L ~=
Au,
f
BU
+ F.
~ ( 2 0 ),= f(z),
where the coefficients A = A ( z , t ) , B = B ( z ,t ) , the forcing F = F ( z ,t ) , and the initial function f = f(z)are Cm-smooth and 1-periodic in z. Also, we assume first that A = A* is Hermitian and call the system symmetric hyperbolic. The assumption of symmetry will be relaxed later. We want to prove that (3.3.1) has a unique smooth I-periodic solution. To this end, let E > 0 be a small constant destined to vanish, and consider instead of (3.3.1) the parabolic system (3.3.2)
~1
+
= E V ~ , Av,
+ BV+ F,
t 1 ( ~ ,= 0 )f(z), E
> 0.
According to Theorem 3.2.7, its solution u = uc exists, and we will prove estimates of ut and its derivatives independently of E. More precisely,
Lemma 3.3.1. For every finite time interval 0 h’p,p = 0, 1,2, ..., with
It 5
T there are constants
Here the constant KOdepends only on T and on bounds for A . A,, B ;for p 2 1, the constant KT,depends only on T and on bounds for A , B and their derivatives of order I p .
101
Linear Variable-Coefficient Cauchy Problems in ID
Proof. We have
Integration by parts gives us
(v,Av,) = ( A v ,v,) = -((Av),,
V) =
-(AIJ,, V) - (A,zI,I J ) ,
and therefore
This shows the desired estimate for llu11*. The function w = V, satisfies (3.3.3)
~t
= CW,,
+ Aw, + ( A , + B)w + B,u + F,.
We have already a bound for u, and therefore we can consider B,u + F, = E as a new forcing function. Thus (3.3.3) is of the same form as (3.3.2), and we obtain the corresponding estimate. Repeating this process, we obtain the estimates for the higher derivatives, and the lemma is proved. Bounds for time derivatives and mixed derivatives of u = 21' can be shown as previously by using the differential equation. We now prove that (3.3.1) has a unique solution and start with uniqueness. If u and u are two smooth solutions then their difference UI = 11 - 11 satisfies the homogeneous system (3.3.1). By the estimate of the above lemma (with e = 0) we have
hence w = 0, and uniqueness is shown. To prove existence, we consider a sequence of solutions uC for e 40. The functions V' are uniformly smooth, and by the general argument given in Appendix 4 we can select a subsequence which converges along with all its derivatives. The limit is clearly a solution of (3.3.1), which also satisfies the estimates of Lemma 3.3.1. To summarize,
Theorem 3.3.2. The symmetric hyperbolic system (3.3.1) has a unique solution u = u(x,t ) . The solution is C"-smooth and satisfies the estimates of Lemma 3.3.1. The spatially periodic Cauchy problem for a symmetric hyperbolic system is well-posed. We shall generalize the result to systems (3.3.1) for which the matrix A is not necessarily Hermitian. For equations with constant coefficients, we defined
102
Initial-Boundary Value Problems and the Navier-Stokes Equations
strong hyperbolicity by the condition that the eigenvalues of A are real and that there is a complete set of eigenvectors. According to Lemma 2.4.2, a matrix A has this property if and only if there is a positive definite Hermitian matrix H with
H A = A*H .
(3.3.4)
For a variable-coefficient equation we can “almost” use this condition pointwise, and obtain a well-posed problem. More precisely, we make the
DeJnition. The variable-coefficient system (3.3.1) is called strongly hyperbolic if there exists a smooth I -periodic “symmetrizer”, i.e., a smooth 1-periodic positive definite matrix function H ( z ,t) such that (3.3.4) is valid for all z, t. For a strongly hyperbolic system we can proceed in the same way as for a symmetric one, if we replace the &-inner product by (3.3.5)
(21, V ) , v ( t )
=
6’
(~(x), H ( z , t > ~ ( zdx. ))
The estimates of the solution and its derivatives follow; see also Section 3.2.5. One obtains
Theorem 3.3.3.
The results of Theorem 3.3.2 hold if the system is strongly hyperbolic, i.e., i f we can find a smooth 1-periodic symmetrizer.
Note that if the problem is only “pointwise” strongly hyperbolic then a matrix H ( z , t) with (3.3.4) exists at each point (z, t) according to Lemma 2.4.2. The only extra assumption we have made is that H ( x , t) depends smoothly on (2, t). The existence of such a smooth symmetrizer is guaranteed if, for example, for all (z, t) the n x n matrix A ( z , t) has n real distinct eigenvalues; in this case the system (3.3.1) is called strictly hyperbolic. Therefore, as in the case of constant coefficients, strict hyperbolicity implies strong hyperbolicity.
3.3.2. Properties of Scalar Equations The simplest case. Let a be a real constant. The simplest hyperbolic differential equation is given by the scalar equation ut
+ au,
= 0.
Its solution for 1-periodic smooth initial data (3.3.6)
.b,O)
=f (.)
103
Linear Variable-Coefficient Cauchy Problems in 1 D
can be written down explicitly: U(X.t)=
f(x - at).
Thus the solution is constant along the so-called characteristic lines x = xo+at. (The important concept of a characteristic is defined below for more general equations.) This shows that there is no smoothing effect; the solution is as smooth as the initial data. For generalized solutions, whose initial data have discontinuities, this fact is particularly important. Consider, for example, the periodic function
which jumps at all integers and half-integers. We approximate f by functions fc E C” by “rounding the comers.” For every fixed E > 0 our problem is solved by u,(z,t) = f,(z- at). Therefore the generalized solution is u ( z ,t ) = f ( z - a t ) ; in particular, the discontinuities move along the characteristics through i and i i E Z.
+ i,
The case a = a(z,t). Suppose a = a(x, t ) is a smooth function, I-periodic in z. A parametrized line (xw),
0 It
< 00,
is called a characteristic for the equation
(3.3.8)
74
+ u ( z , t)u, = 0
if
dx
t 2 0. dt Since a ( z , t ) is bounded in every finite time interval, it is clear that a unique characteristic exists through any given point (T,?). If u solves (3.3.8) and ( z ( t ) t) : is a characteristic, then (3.3.9)
- ( t ) = a ( z ( t ) ,t ) ,
d dt
dx + dt = ut + u, U(Z,t ) = 0.
- u ( z ( t )t, ) = ut
Thus the solution u of
21,
104
Initial-Boundary Value Problems and the Navier-Stokes Equations
cames the value f(z0) along the characteristic ( z ( t )t) , starting at ( ~ ( 0 0))=~ (~0~0) If .the initial function f(z)has a jump discontinuity at z = 20, then the generalized solution u ( z ,t) will jump when crossing the characteristic
( z ( t )t) , with z(0) = 5 0 . In other words, discontinuities move along the characteristics.
The inhomogeneous equation. We can also solve inhomogeneous problems (3.3.10)
ut
+ a ( z ,t ) ~ =, F ( z ,t).
U ( Z ,0 ) =
f(~).
Characteristics are defined as for the case F = 0, i.e., by condition (3.3.9). If ( z ( t )t), is a characteristic and u ( z , t ) solves (3.3.10), then
and therefore (3.3.11)
+
u ( z ( t )t, ) = f ( ~ )
I’
F ( x ( T )T, ) dT, ~ ( 0=)20.
Suppose F is only piecewise smooth with jump discontinuities along lines which are nowhere tangent to a characteristic. In this case the integral in (3.3.1 1) mollifies the jumps of F. The generalized solution u is continuous if f(z)is continuous. I f f has jumps, these travel along the characteristics; the discontinuities of F do not introduce new jumps in the function u, but - in general in the derivatives of u.
The general linear case. For equations ut
+ a ( 2 ,t)u, = b(z,t)u + F ( z :t )
the characteristics are again defined by condition (3.3.9). If u solves the above equation, then
along each characteristic. Thus we can obtain u ( z ( t )t, ) by solving a linear ordinary differential equation.
3.3.3.
Properties of Hyperbolic Systems
The case A = const, B = 0. Consider a strongly hyperbolic system (3.3.12)
~t
+ Au,
= F ( z ,t )
105
Linear Variable-Coefficient Cauchy Problems in 1 D
with a constant coefficient matrix A . There is a nonsingular transformation S such that
. . AT,).
S-IAS = A = diag (AI,..
A, real.
If we introduce the new variables v = S-Iu, then the equation (3.3.12) transforms to vt
+ Av,. = H ( z ,t ) ,
H = S-IF.
Thus we obtain n uncoupled scalar equations VJt
+
= HJ(T,t), j = 1 , .. . . n,
AJUJ,.
and the considerations of the previous section apply.
The wave equation. An important example is obtained from the wave equation Ytt
= V.r.r
with I-periodic initial data (3.3.13)
? A Z ,0 ) =
We introduce a new variable
71
f(.),
Y t ( X . 0 ) = g(.c).
by vt =
y,.
The wave equation then gives us Ytt
= Yr.r = V t s = V.ct.
hence integration in t yields yt = 71,
For
71
+ h(r).
we have the initial condition u,.(r, 0)=
and if we choose h(s)= ho =
so
Zj(Z,O)
1
=
- MT),
g(<)d,$, then
LT[m
- ho] 4
is a 1-periodic initial condition. To summarize, if with initial conditions (3.3.13), then
solves the wave equation
106
Initial-Boundary Value Problems and the Navier-Stokes Equations
solves the hyperbolic system Ut
=
( y i) (2) u,+
=:AIL,+
(2) ,
Conversely, if u solves the above system, then the first component y = u I solves the original problem. The eigenvalues of A are XI = + I , A2 = - 1. If
S-'AS = diag (XI, A*) = A, then the transformation w = S-lu leads to
wt = Awx
+ S-'
(2)
and we can obtain a solution in closed form. As a result, one finds that 1
1
t )=
p + t ) + f(z
-
t ) }+ 2
I-, x+t
Strongly hyperbolic systems. We will explain here how to obtain the solution of a general strongly hyperbolic system by solving a sequence of scalar equations and going to the limit. The scalar equations themselves can be solved by the method of characteristics, as discussed above. In this way one can study in detail how discontinuities propagate and one can prove that information travels at a finite speed. Consider a general linear system
and assume that there is a smooth transformation S = S(z, t) such that
S-IAS = A(z, t ) = diag (Xl(z, t ) ,. . . ,Xn(z,t ) ) , Xj(z, t) real. Introducing new variables u = S-Iu, we obtain
StU
+ SVt + AS,U + ASU, = BSV + F,
and therefore Vt
(3.3.14)
+ Av,
+ H:
u(.,O) = g = s-y
= CU
C = S-IBS
-
S-ISt
-
S-IAS,,
H = S-IF.
107
Linear Variable-Coefficient Cauchy Problems in ID
Solution by iteration.
System (3.3.14) suggests the iteration
+ Au,t+l
,,:+I
(3.3.15)
= Gk,
?]k+I ( X , O ) = .9(s).
G" = Ctlk + H . k = 0,1.2.. . . ,
starting with uo(x,t ) = 0. For every k = 0, I , 2 , . . . the initial value problem (3.3.15) represents 71 scalar equations which one can solve by the method of characteristics. Accordingly, one makes the
DeJinition.
The lines
( x , ( t ) , t ) , t 2 0. j = 1, . . - . 7 1 . with J dx ( t ) A, (T,(t). t ) .
dt
t 2 0.
are called characteristics for the system (3.3.14) (and also for the given system written in u-variables). Through any point (T,?) there are n characteristics (.r,(t). t) with s,(T)
=s, j
= 1, .. . , n.
These are distinct if the system is strictly hyperbolic, i.e., (3.3.16)
Al(Z,
t ) < A2(J-, t ) < .. . < A,,(X, t ) ,
but otherwise two characteristics can be identical. To study the iteration (3.3.15), we fix a point (T,?). The characteristics through this point intersect the z-axis in X I (0),. . . , s,,(O).
't
FIGURE3.3. I .
Characteristics through a given point (5,?),
108
Initial-Boundary Value Problems and the Navier-Stokes Equations
Note that the characteristics do not depend on the iteration index k. We obtain from (3.3.15) d dt
- v:+'(s;(t),t)= G f ( z j ( t ) , t ) ,
G k ( s t, ) = C(Z,t)vk((z, t)
+ H ( z ,t )
Integration yields t
(3.3.17)
vf+'(F,?)=i G~(s;(~),~)dr+g(s;(O j = ) ) l, , . . . , n .
Let us show that the sequence v k converges to the solution v. We will use the following auxiliary result, which we refer to as Picard's Lemma.
Lemma 3.3.4. Let $ ( t ) , k = 0, 1 , . . ., denote a sequence of nonnegative continuous functions which satisfy the inequalities q k + l ( t )5 a
+b
t
i
v'(T)~T,
0
It I T ,
with nonnegative constants a , b. Then
f o r 0 I t I T and k = 0, 1 , . . . In particular, the sequence V k ( t ) : 0 5 t 5 T , is uniformly bounded. If a = 0. then the sequence converges uniformly to zero.
Proof. For k = 0 the estimate is true. Assume it is valid up to the index k. Then Vk+l(t)
Ia + a
k
but" x u= I
U!
+
bk+ I t k + I
(k
+ l)!
max
+)(T),
o
and the lemma is proved. We use this to show the following convergence result.
Lemma 3.3.5. (3.3.15). Then
Suppose v solves (3.3.14), and the sequence uk is defined by
max { lu(z,t ) - v k ( z ,t)l : z E R, 0 5 t 5 T} -+ 0 as k
-+
00:
109
Linear Variable-Coefficient Cauchy Problems in ID
for any fixed T . Here it is assumed that all data are smooth and 1-periodic
in x. Proof. The solution u satisfies d -dtv J ( x j ( t ) , t ) = G , (z, (t ), t ), G ( x ,t ) = C ( T ,t ) v ( x ,t )
+ H ( z ,t ) .
Therefore we obtain, for the difference W' = u' - v, d ur"+'(x,(t).t) = {C(s,(t),t)w'(x,(t).t)}3 ; dt
-
J
thus
1 t
wF+'(?i?,t)=
{ C ( S ~ ( T ) , ~ ) ( U ~ ( Sd ~ r , (j T=) .1 ..... T ) } R~.
If we set 7jk(t)
= max { I w k ( x ,.)I
:s E
R, 0 5 r 5 t } ,
then, for 0 5 2 5 T ,
An application of Picard's Lemma (with a = 0) yields
$ ( t ) 5 const
1
- (cT~)'.
k!
This proves the convergence.
Propagation of discontinuities. We can use (3.3.17) to deduce properties for the sequence 11' = vk(x,t)and then go to the limit as k + cx). Consider, for example, the discontinuous initial data VI(Z,O)
= f ( x ) , v2(x,O) = . . . = v,,(s,O) = 0,
where f is given in (3.3.7). For simplicity assume F = N = 0 and assume the system is strictly hyperbolic, i.e., (3.3.16) holds. The function vf ( x ,t ) represents the pulses whose edges are moving along the characteristics ( x l ( t )t, ) starting i E Z. All other components at (xl(O),O) = ( i , O ) , (x1(0).0) = (i vJl ( s . t ) = 0, j = 2, ... , n .
+ i.O),
110
Initial-Boundary Value Problems and the Navier-Stokes Equations
By our considerations for scalar equations, it follows that v:(z,t) has jumps when crossing the Characteristics (zl(t).t) mentioned above, whereas vi(z,t), j = 2 , . . . , n, is continuous. The reason for the continuity of the latter functions is that the characteristics (xJ(t).t ) , j = 2, ..., n, are nowhere tangent to the discontinuity lines (xl(t),t) of the forcing. This is the qualitative behavior for all iterates u k ,and therefore of the solution itself. There are no difficulties in discussing the behavior for more general piecewise smooth initial data because we can split these up into a smooth function plus simple jumps. A discontinuity of the initial data at x = z o propagates along the characteristics which start at (r.t ) = (zo, 0).
The finite speed of propagation. Another important property of hyperbolic differential equations is the so-called “finite speed of propagation” which we explain in the next theorem. Consider again the system (3.3.14) under assumption (3.3.16).
Theorem 3.3.6. For a given point ( T ,t) let (xl(t),t ) ,. . . , (z,(t),t ) denote rhe characteristics through ( T , j ) ; see Figure 3.3.1. Let R denote the region hounded by the two characteristics
and the piece of the initial line
Then the restriction of the solution u ( x , t ) to the region R only depends on the x,,(O). In other words, restriction of H to R and of g to the interval x l ( 0 ) 5 x I we can change H and g outside these regions without affecting u inside 0. Proof. Consider any point ( 2 ,f) E R. Then the characteristics
( ~ , ( t )t). for 0 5 t 5 f , j = 1 , . . . .n, through (F.f ) also belong to R. Now consider the iteration (3.3.15). It is clear that the restriction of u 1 to R depends only on the corresponding restrictions of H and g. By induction we obtain that all functions uk have this property, and therefore it is valid for the limit also. This proves the theorem.
In Section 6.2 we shall prove a similar theorem for hyperbolic systems in several space dimensions using a difference approximation.
111
Linear Variable-Coefficient Cauchy Problems in ID
3.4. Mixed Hyperbolic-Parabolic Systems Consider a system of the following block form
(3.4.1)
w =
(;)
UUI(X,O)
I
= f(.-).
It is assumed that all coefficients and data are Cx-smooth and 1-periodic in .r. Also, let (3.4.2) A2
+ A; 2 261 > 0 in 0 5 t 5 T ,
d = 6(T)> 0. and
B22
= B&.
If B12 = (212 = 0, BZI= C2, = 0, then we have a strongly parabolic u-equation and an uncoupled symmetric hyperbolic u-equation. Assuming (3.4.2), we want to show that the spatially periodic Cauchy problem for the mixed system (3.4.1) with coupling terms is well-posed. First consider the parabolic systems
According to Theorem 3.2.7, there is a unique solution U I = illf of the Cauchy problem for E > 0. We shall show that the solutions wf and their derivatives can be estimated independently of E > 0; we start with the basic energy estimate.
Lemma 3.4.1.
For any T
> 0 there is a constant K ( T ) ,independent of E > 0,
with
Proof. We write T . We have d -
dt
UI
= we.The norms
(w.20) = (w, Wf)
I
below refer to the interval 0 5 t 5
+(mt,w)
+ (v. v t ) + u ) + ( u t . 5 -2~(I0,11~+ I + I1 + I11 + IV + 2{ ICI, I I u ' ~ ~ +~ IIuJII
= (u. u t )
(Ut.
2')
IIFII}.
where
I = (~.A~u~,)+(A~u,,.u)+(u,BIIu~)+(BIIu~.~ 11 = ( u , B 2 2 U , )
+ (B22U,,
v).
112
Initial-Boundary Value Problems and the Navier-Stokes Equations
111 = (u.B12v.c) IV = (v. B 2 1 U z )
+ (BIZvz, + v)
U),
(BZIU,,
The term I can be estimated as explained in Section 3.1.1 where we treated parabolic systems: 1
5 -2611~,112 +2{lA2.clx
+ lB1llx) 1141 I I ~ L I I
+ c1114I2.
L -611%112
The term I1 can be treated as explained in Section 3.3.1 for the symmetric hyperbolic case: 11 L
IB22.rl
llul12.
Integration by parts gives us for 111:
I11 = -(u,., BI*V)- (21, B1zsv) - (B,2a.U , [ ) - (B12,V. u ) I21B121m
II4I IIU.zII + 21B12slr. llUll I l 4
6
I 5 l l ~ r I l+ 2 c2{ 11412+ 1142). Finally, IV
L
6
5 lu,1I2 + c111142.
Summarizing, we have shown that d
dt llw1l2 L
where
c4
does not depend on
E.
C4{I1"1l2
1-
1lFIl2)
This proves the lemma.
It should be remarked that the estimate of Lemma 3.4.1 is also valid for E = 0 if we assume the existence of a smooth solution for this case. Thus uniqueness for (3.4.1) is shown. To obtain existence, we estimate all derivatives of w' independently of E . Differentiation of the system (3.4.3) with respect to T yields an equation for UJ:. with the same structure. Observing that we already have estimates for 1) ufcI), we can bound llzu;. 1) in the same way as above. Estimates for higher space derivatives are obtained by repeated differentiation. This proves
For any T > 0 and any p = 1,2,. . . , there is a constant Lemma 3.4.2. K ( p .T ) ,independent of E > 0, with
113
Linear Variable-Coefficient Cauchy Problems in ID
Here K ( p , T ) depends only on the maximum norm of the coeficienrs and their derivatives of order 5 p . Time derivatives and mixed derivatives of w' can always be expressed by space derivatives using the differential equation. Thus we have estimates for all derivatives. Now consider a sequence t -+ 0. According to Appendix 4, we can select a uniformly smooth subsequence of wf which converges along with all its derivatives. The limit solves (3.4.1) and obeys the estimate (3.4.4). This proves
Theorem 3.4.3. The spatially periodic Cauchy problem for the mixed system (3.4.1) is well-posed if(3.4.2) is true. Thus far, the underlying uncoupled equations were assumed to be strongly parabolic or symmetric hyperbolic. We can generalize our result to the case where instead of (3.4.2) it is assumed that there are smooth symmetrizers:
HlA2
+ A ; H I 2 6H1 > 0.
H2B22
HJ = H,' > 0 smooth, I-periodic in
= B&H2,
2.
j = I , 2.
To obtain the estimates for the more general case, we use the scalar product (w.6 )=~(u, H Iii)+(v,HzD) instead of the L2-scalar product (w. 27') = ( u ,ii)+ (v,a).
3.5. The Linearized Navier-Stokes Equations in One Space Dimension Suppose the variables u . 71. uj. p. p do not depend on y. Stokes equations read
3.
Then the Navier-
P(;)t+P(:q+(;) UW,
114
initial-Boundary Value Problems and the Navier-Stokes Equations
This system uncouples into a system for (u, p), Put
(3.5.1)
Pt
+ puu, +
PT
+ pu, + up,
= (2p
+ I.L’)u,, + pF,
= 0,
P = r(p),
and two scalar equations
wt
+
UW,
Y =w,, P
+ F3.
The equations for 2) and w are linear if u , p are considered as known functions. Clearly, these equations are parabolic in the viscous case ( p > 0), and strongly hyperbolic in the inviscid case ( p = 0). We now linearize the system (3.5.1) at a smooth flow U = U ( z ,t ) ,R = R(z,t ) ,P = P ( z ,t) with P = r(R). Substitute u = U u’,p = R + p’, p = P p’ into the equations (3.5.1) and neglect terms quadratic in the corrections. The equation of state gives us
+
+
p =P
+ p’ = r(R + p’)
-
+
r ( R ) np’,
K
=
dr
-(R); dP
thus p’ = ~ p to’ first order. Therefore we can eliminate p’ and obtain for u’, p’ a linear system
Here C and G are determined by U , R, P, and F. For p > 0,p’ 2 0, the system is of mixed hyperbolic-parabolic type. In the inviscid case p = p’ = 0 we obtain, upon neglecting the zero-order term and the forcing function,
Now suppose that
Then the eigenvalues
of A are real and distinct:
115
Linear Variable-Coefficient Cauchy Problems in 1D
The system (3.5.2) is strictly hyperbolic and has the symmetrizer
H ( x !t ) =
(A i)
, h = tc/R2.
This symmetrization simply corresponds to the introduction of a scaled density in (3.5.2); if
then the system for (I" becomes
One easily confirms directly that the new system matrix is symmetric,
The positivity assumption (3.5.3), which is crucial for hyperbolicity, is physically reasonable because one expects increasing pressure with increasing density. Furthermore, the interpretation of the eigenvalues X1.2 = U fa as characteristic speeds (see Section 3.3) makes it plausible that
is the sound speed corresponding to the base flow with density R. It is the speed of propagation of small disturbances in the base flow.
3.6. The Linearized KdV and the Schrodinger Equations We have shown the well-posedness of the spatially periodic Cauchy problem for linear variable-coefficient equations in case of a parabolic, a strongly hyperbolic or a mixed system. Basically, integration by parts applied to the differential equation and the differentiated differential equation gave us estimates of any possible solution and its derivatives. For the parabolic case we then used a difference scheme to obtain existence; the strongly hyperbolic and mixed systems were considered as limits of parabolic ones. These techniques can be applied to other equations also, as will be demonstrated here for the linearized KdV and the Schrodinger equations.
116
Initial-Boundary Value Problems and the Navier-Stokes Equations
3.6.1. The Linearized Korteweg-de Vries Equation The nonlinear equation
+
w t ww, = bw,,,,
6 = const, 6 real,
is known as the KdV equation. We linearize about a smooth function U = U ( z ,t ) . Upon neglecting quadratic terms in u, the ansatz w = U u leads to
+
(3.6.1)
ut = au,
a = -U,
+ bu + 6u,,, + F, b = -Uzl
F = SU,,,
- UU, - U.
We assume that all functions are real, Coo-smooth, and 1-periodic in x. If u solves (3.6.1) then
( u ,au,) = (ua,u,) = -(u,a, u ) - (ua,, u ) ,
and thus 1 ( u ,au,) = --(ua,, u). 2 Also,
Lemma 3.6.1. For any T > 0 there exists K ( T ) > 0 such that any solution of (3.6.1) satisfies the estimate
The above lemma implies uniqueness of a solution for given initial data (3.6.2)
u(2,O)= f(z),
f
E C",
f(z)= f(Z
+ 1).
Linear Variable-Coefficient Cauchy Problems in ID
117
To estimate u = u,, we differentiate the equation (3.6.1) and obtain
+ ( b + W,)U + SV,,, + G ,
uf = U V ,
G = F,
+ b,U.
Thus we can estimate v = 7 1 , ~following the same arguments as above. With repeated differentiation one obtains
For any T > 0 and any p = I , 2,. . . there exists K ( p , T ) with
Lemma 3.6.2.
The constant K ( p ,T ) depends only on bounds for a and b and their derivatives up to order p . Estimates of time derivatives and mixed derivatives of any solution follow from the differential equation. To obtain existence of a solution of (3.6.1), (3.6.21, we can use the difference scheme duv
- = U,
dt
+
DOV, bvu
+ 6DoD+D-vv + Fv, ~ v ( 0=)
fl,,
and mimic the previous estimates. The Fourier interpolants w”(z.t) of u , = v i ( t ) w.r.t. r are uniformly smooth. Exactly as in Section 3.2.4, one obtains u , h ( r .t ) + u ( 5 ,t )
for a sequence h = h,
+ 0.
The limit u solves the Cauchy problem.
Theorem 3.6.3. The spatially periodic Cauchy problem for the linearized KdV equation is well-posed. The solution satisfies the estimates of Lemma 3.6.2. 3.6.2.
A Schrodinger Equation
Consider the spatially periodic Cauchy problem (3.6.3) (3.6.4)
Ut
= @U.r).r.
p real, P ( Z , t ) 2 Po
u(x,O) = f(x), p ( z , t ) = p(.c
+ 1, t ) ,
> 0,
f ( z )= f ( z
The equation is neither parabolic nor hyperbolic. For problem (3.6.5)
ut = 6u.c.r
has a unique solution
7~
dt
> 0,
u ( z ,0 ) = f(z)
= u c . For u = U‘ it holds that
d -(U.
+ i(pu.r).r.
t
U)
= ( u ,U t )
+
( U t , u)=
+ 1).
-2€11u1,112 I 0,
the parabolic
118
Initial-Boundary Value Problems and the Navier-Stokes Equations
and thus ~ ~ u ( ~5 , IJu(.,O)11. t ) ~ ~ This estimate is valid for E = 0 also; thus uniqueness of a solution of (3.6.3), (3.6.4) follows. We now show how to bound derivatives of u = u L . We let w = ut. The differential equation (3.6.5) yields uxx
1 iPZ v-= E+ip E+ipuxl
and therefore (see Lemma A.3.2 in Appendix 3)
Thus we have the estimates (3.6.6)
lu,Il
I c{II'UII
+ ll4l}, I I ~ x I l5 c{J J ~+I III4l},0 It 5 T ,
where C = C(T).Differentiation of (3.6.5) w.r.t. t gives us wt
= E?J,,
+ i(PVz), + i(Pt%)x.
By (3.6.6) we find d -(v, v) = (v, V t ) dt
+ ( u t ,v)
Thus we can bound
II4l = IIWII? Ibxll, l l ~ x x l l independently of E in any finite time interval 0 5 t 5 T. Higher derivatives can be estimated in the same way by repeated differentiation. The functions u' are uniformly smooth, and by the same arguments as before, we obtain a solution of the Schrodinger equation for E 4 0.
Notes on Chapter 3 Parallel to the theory of differential equations, the theory of difference approximations was developed; see Osher (1972), Michelson (1983, 1987), Richtmeyer
Linear Variable-Coefficient Cauchy Problems in 1 D
119
and Morton (1967), Kreiss and Oliger (1973), Kreiss (1968), Gustafsson, Kreiss, and Sundstrom (1972). It is not new to prove existence of solutions by difference approximations; see, for example, Friedrichs (1954). Instead of using Lz-estimates, parabolic differential equations are often treated via the construction of fundamental solutions and maximum norm estimates. The classical books are Friedman (1964) and Eidelman (1964). We develop the &theory because we are interested in coupled hyperbolic-parabolic systems. For hyperbolic systems in more than one space dimension, estimates in the maximum norm can, in general, only be obtained under “loss of derivatives”; see Brenner (1966). A more detailed discussion of the method of characteristics can be found in many books, for example in Petrovskii (1954), Courant and Hilbert (1962), Carrier and Pearson (1976).
This Page Intentionally Left Blank
4
A Nonlinear Example: Burgers ’ Equation
The Cauchy problem for the viscous and the inviscid Burgers’ equation will be discussed in detail in this chapter. The techniques we apply can mostly be generalized in a straightforward way to more complicated nonlinear parabolic or hyperbolic equations, to systems in one or more space dimensions. These generalizations will be carried out in Chapters 5 and 6. In other words, we will use Burgers’ equation as a simple example to illustrate a number of general techniques for the treatment of nonlinear evolutionary systems. Intentionally, we do not apply the celebrated Cole-Hopf transformation, which reduces Burgers’ equation to the heat equation. (Though the Cole-Hopf transformation does have interesting generalizations also, these seem to be too limited, at present, to discuss the Navier-Stokes system.) We emphasize in this chapter:
1. local (in time) existence of solutions via a linear iteration; 2 . local existence together with global (in time) a priori estimates leads to global existence;
3. smoothing properties for the parabolic, i.e., viscous case; 4. breakdown of smooth solutions for the hyperbolic, i.e., inviscid case in finite time. Concerning these points, our discussion of Burgers’ equation is representative for parabolic and hyperbolic systems.
121
122
Initial-Boundary Value Problems and the Navier-Stokes Equations
With regard to other aspects, namely global a priori estimates, the maximum principle, and our discussion of shocks, the techniques for Burgers’ equation do not readily generalize. The difficulties involved will become apparent in Chapters 5 and 6.
4.1. Burgers’ Equation: A Priori Estimates and Local Existence In this section we start our discussion of Burgers’ equation ut = uu, + E U , , ,
u(2.0) = f(5), f E C”,
> 0,
const
E =
(4.1.1)
= f(2 + l ) ,
f(2)
with periodic boundary conditions. We assume that all functions are real-valued. Burgers’ equation is of interest to us, since it shares its mathematical structure ut = quadratic first order term
+ diffusion term
with the Navier-Stokes system. After showing the uniqueness of a classical solution, we prove a priori estimates in some time interval 0 5 t 5 T. To obtain these estimates, we intentionally do not make use of the maximum principle. Therefore, the proof generalizes to systems for which maximum principles are generally not available. Also, we show a priori estimates which are independent of E . Thus we can use the same arguments later to discuss the inviscid case ( E = 0). To show existence of a solution in some time interval, one can proceed in different ways. A first possibility is to use a difference scheme as in Chapter 3, and to show estimates of its solutions v h independent of the step-size h. We will write down a suitable difference approximation, but leave the necessary estimates to the reader. These estimates can be obtained along the same lines as the a priori bounds for the solution u. In the same way as in the linear case, one can Fourier interpolate the functions vh w.r.t. 2 and obtain uniformly smooth functions w”(z,t); these converge to a solution u(z,t ) as h + 0. In the text we shall use another approach to show existence, namely the iteration u?L+I
(4.1.2)
t Un+l(2,0)
- u7q+’
=f(.)>
+ E u,,
?Z+
I
,
72=0,1,2,
...;
where uO(rc.t)= f(x). The sequence u7’ will be shown to converge, and its limit will solve (4.1.1). Again, we will not apply the maximum principle, and thus the local existence proof generalizes to systems.
123
A Nonlinear Example: Burgers' Equation
4.1.1. Uniqueness A classical solution of (4.1.1) is a function u E C ' ( t )n C 2 ( c )which satisfies
(4.1.1) pointwise. We first show
Lemma 4.1.1. sical solution.
The 1 -periodic Cauchy problem (4.1.1) has at most one clas-
Proof. Let u and v be solutions. Their difference w = u - v satisfies 1 wt = -(aw),
+
2
EUJ,r,,
a =u
+v,
w(x,O) = 0.
From
(w. (aw),)= (w, a,w
+ aw,) = (w,a,w)
- ((aw),, w)
one finds that 1
(4.1.3)
caw,,) = -(w, azw), (w, 2
and therefore
I d 2 dt
I
- -(UI,
w)= (w, U J t ) = - (w, (aw),)- €(W,, w,) 2 =
1
-(w, a,w) 4
- €(W,, wx)
1
I 1% 4 The initial condition w(z,0) = 0 implies w
lcx:(UJ,
w).
= 0.
4.1.2. A Priori Estimates Let u denote a C"-solution of (4.1.1) defined for 0 5 t 5 T . First note that
d -I -(u. u ) = (21, uu,) - tllu,ll 2 . 2 dt
The first term on the right side is zero since
(u, uu,) = (u2 , u,) = -2(u, uu,). Thus we find $ ( u , u) 5 0 and obtain the bound (4. I .4)
IId.,t ) ( (5 IIu(.,O)(( = IIfll.
0 It I T.
124
Initial-Boundary Value Problems and the Navier-Stokes Equations
To show estimates for space derivatives, we use the notation uj = a3’u/8x3’. The function u I satisfies Ult
= (uuz)I
+ tulzz,
and therefore
Furthermore, the estimate
follows from Fourier expansion. Hence we have
(For t > 0, we could now derive a bound of J ( U ~t)ll; ( . ~the timeinterval where the bound holds would depend on E , however. Therefore we proceed differently and show first an estimate for u2.) The function 212 satisfies
and thus
A Nonlinear Example: Burgers’ Equation
125
Using the abbreviations
?At)= IIu2(.,
4(Y)
t)1I2,
= 5Y3/2,
we have shown the differential inequality y‘(t)
0I t 5 T.
I 4(y(t)),
To estimate y ( t ) , we need a nonlinear extension of Lemma 3.1.1.
Lemma 4.1.2. Let 4 E C1[O,M), and let ~ ( tand ) yo(t) denote nonnegative C1-functionsdefined for 0 5 t I T . If
Y’W I &!At)),
Y A W = 4(YO(t))l
0I tI Tl
Proof. For any two arguments y, yo of 4 we have
and obtain
If we introduce
~ ( t=) exp(-
I’
c(~)d~)q(t),
then z ’ ( t ) 5 0 and 4 0 ) = ~ ( 05) 0. Therefore z ( t ) 5 0, and thus ~ ( t5) 0. This proves the lemma.
To apply this result, we note that the solution yo(t) of
Y A W = 5Y:/2(t),
YO(0) = llfzzl12
126
Initial-Boundary Value Problems and the Navier-Stokes Equations
is increasing, and if yo(0)
> 0, then there is a time T, > 0 with lim yo(t) = 00.
t-T,
Therefore, the previous lemma gives us a bound for 11u2(.,t)llin any interval 0 5 t 5 T < T,. By (4.1.4) and ( 4 . 1 3 , Ilul(.,t)JIand llu(.,t)ll are also bounded for 0 5 t 5 T < T,. The proof clearly shows that the time T, and the bound do not depend on 6 2 0. The value E = 0 is allowed. We summarize:
Lemma 4.1.3. Consider (4.1.1) with E 2 0. There exists a time T > 0 and a constant K2, both depending only on 11 f I ( H 2 , with the following properly: I f a solution u(x,t ) is defined for 0 5 t 5 T then I l u ( . , t ) ( l H ~5 K2
in 0 5 t 5 T
We proceed by showing estimates for all space derivatives uj = d j u / d x j of u. Interestingly, the time interval for which the estimates are valid does not depend on j nor on E 2 0.
Lemma 4.1.4. Suppose u is a C"-solution of (4.1.1) defined for 0 5 t 5 T , T being fuced as in the previous lemma. For j = 2 , 3, . .. there is a constant K j , depending only on l l f l l H J ,with
Ilu(.,t)llH,5 Kj
in 0 5 t 5 T.
Proof. We use induction on j . The case j = 2 has been treated in the previous lemma; thus let j 2 3. The identity ujt
= (UU,)j
+
EUj,,
implies that
Here
The terms
(uj,u , u j + ~ - ~ can )
be estimated as follows: For v = 1 , . . . , j - 2,
127
A Nonlinear Example: Burgers’ Equation
If c j is a suitable numerical constant, we find that d
2 11u311
2 IIuIIHJ
I ‘3
llullHJ-I
5 cj
I I ~ I I H J -I ~ IU~
(
1 1 +~ 11u11ii-1)
5 cj h j - l (Ilu3112 Thus the induction step can be completed, and the lemma is proved.
T, we can Since we have bounded all space derivatives of u in 0 5 t I use the differential equation ut = uu, + EU,, to bound all time derivatives and mixed derivatives. Each term dP+9
dxP&Qu(x,t , can be written as a sum of products of space derivatives, and hence it can be bounded. The bounds are uniform for 0 5 E 5 €0, €0 > 0 being fixed.
4.1.3.
Existence of Solutions via Difference Approximations
As in Section 3.2, we can discretize in space and approximate (4.1.1) by a
system of ordinary differential equations:
dv, dt
1 (v,Dov, 3
-= -
+ Dov;) + ED+D-v,,
V”(0) = f”.
+
Here DO = 1/2 (D+ + 0 - ) ,and we have approximated uu, = 1/3 (uu, (u2),) by 1/3 (PI,DOv, DO$). This approximation has the technical advantage that
+
128
Initial-Boundary Value Problems and the Navier-Stokes Equations
(v,V D 0 V ) h
+ (v,D 0 V 2 ) h = (v2:D0V)h - (Dov,V 2 ) h = 0:
and therefore we obtain the basic energy estimate from
Bounds for 110~ dqv/dtq(lh independent of h can be obtained along the same lines as the a priori estimates for u in the previous section. Thus we can proceed as in Section 3.2: Fourier interpolate v = v h with respect to 2 and send h + 0. We obtain existence in some interval 0 5 t 5 T, T depending only on I l f I I H 2 .
4.1.4.
Existence via Iteration
To prove existence via the iteration (4.1.2), we estimate the functions uLIL independently of n. Again, our estimates will not take advantage of the diffusion term EU,,, and so will not depend on E 2 0. All of the arguments are without reference to the maximum principle, thus generalize from scalar equations to systems. To show uniform smoothness of the sequence u", we start with the following analogue of Lemma 4.1.3.
Proof.
We use induction on n; the case n = 0 is trivial. As abbreviations, let
w = un,v = u"+', thus
vt = w v,
+ EV,,.
Note that I d --(?J,v) 2 dt
= (v, wv,)- E(V,,V,)
129
A Nonlinear Example: Burgers' Equation
and therefore
Finally, u2t
= (U"U1)z.z
+ f7J2z.E
implies that
Adding the three inequalities, we obtain from the induction assumption that
d dt
2
-ll41$2
IS IlWllHZ l b I l $ 2 I 10 llfllH2 l l ' U I l H 2 ,
and therefore Ilu(.,t)11$2
I exp (lOllflIH2 t )
l1'U(.,O)I1~2.
Thus we can complete the induction step if TI > 0 is exp
(
SO
small that
I
~ O I I ~ I I H Z T I )4.
This proves the lemma. We show now that all space derivatives of u" can be estimated in the same interval 0 5 t 5 T I .
Lemma 4.1.6.
For each j = 2 , 3,
. . . there exists hj with
IIun(.,t)llHJ5 K j The constant Kj depends on 11 f JIH, ,
in O 5 t
I TI.
but is independent of n and
E
2 0.
Proof. As previously, let w = u n , u = u"+I . We can assume j 2 3 and (lw((H,-'I h;-I.
ll~llH,-' I K3-I.
130
Initial-Boundary Value Problems and the Navier-Stokes Equations
From
it follows that
For v = 1 , . . . , j - 2 it holds that J("j,
wuq+1-u)I
5 IbjII lw/lm llVj+l-ull I Kj-l lbjIl2.
(Note that l l w ~ l l I (Iuj(1 for 1 I j , by Fourier expansion and Parseval's relation.) For v = j - 1, j it holds that (see (4.1.5))
I("j, wj-l V2)I I Kj-lll"jll l"2100 I Kj-Ill"jlI 2 > K"j, w j "l)l I b l l m Ibjll Il"jII I Kj-l(ll"j1I2+ llwjl12h For v = 0, integration by parts gives us
Now the desired estimate follows from Picard's Lemma 3.3.4. Summarizing, we have estimated the L2-norms of all space derivatives of T I ,TI = TI (IlfilH2). By the Sobolev inequality the sequence un in 0 5 t I stated in Lemma 3.2.5, the functions d j u n / d x J are also bounded in maximum norm. Since we can always use the differential equation (4.1.2) to replace time derivatives by space derivatives, it follows that (4.1.6)
131
A Nonlinear Example: Burgers’ Equation
Here C(p,q) is independent of n and 0 5 c 5 to, where €0 is arbitrary but fixed. We finally show
Theorem 4.1.7. Let T I = TI ( I l f l l H 2 ) be determined as in Lemma 4.1.5. For any t 2 0 Burgers’ equation has a C”-solution u(x,t ) defined for 0 5 t 5 T I . Proof. Consider the sequence u7’defined by the iteration (4.1.2) and abbreviate 2,
w = un
= un+l - un,
- un-l.
Then vt = unv,
+ u;w + EU,,,
v(x,O)= 0
implies that I d 2 dt
- - 117111
2
5 (v,7LT’VZ) + (v,2L;zu) 1
= --(u, u;
2
v) + (v,u;w)
L const (11v112 + ~ ~ w ,~ ~ o2 5) t 5 T ~ . Therefore (by Gronwall’s Lemma 3.1. l),
1 t
llun+l(.,t ) -
uTL(., t)1I2 5
K
2
IIun(.,7) - un-l(., r)ll d r ,
0
where K is independent of n. Thus, by Lemma 3.3.4, the sequence un(.,t) converges to a function u(.,t ) E L2. The smoothness estimates (4.1.6) imply that u E Coo,and the convergence un --+ u holds pointwise and also holds for all derivatives. (See Appendix 4.) Then the equation (4.1.2) implies that u solves Burgers’ equation.
4.2. Global Existence for the Viscous Burgers’ Equation In this section we use the Cauchy problem for Burgers’ equation to illustrate an important principle. Loosely formulated it says: Local existence together with global a priori estimates leads to global existence. We will formulate the a priori estimate in the following theorem. Throughout this section, t > 0 is arbitrary but fixed.
132
Initial-Boundary Value Problems and the Navier-Stokes Equations
Theorem 4.2.1. Let f = f ( x ) denote I-periodic C" initial data, and let u E C" denote a solution of (4.1.1) defined for 0 5 t I T . There is a constant K , depending on I(f [ I H z (and E ) hut independent of T , with (Iu(.,t)llHZ 5K
(4.2.1)
for 0 I tI T.
(The smoothness assumption f E C" is unnecessarily restrictive and will he relaxed later.)
Assuming this result is proven, we can show all-time existence for the problem (4.1.1) as follows: According to the Local Existence Theorem 4.1.7, there is a time TI > 0 with a Cm-solution u defined for 0 5 t 5 T I .By (4.2.1) we have 114.1
Tl>IIfpL K.
We can use the function z 4 u(x, T I )as new initial data and apply the Local Existence Theorem 4.1.7 again. The solution starting with the initial data u ( . , T ( )exists in a time interval 05t I T2, T2 depending only on ' h (and 6 ) . Clearly, putting the two solutions together, we have a C"-solution u of (4.1.1) defined for 0 I t 5 TI T2. The important point is that the a priori estimate (4.2.1) implies that
+
with the same constant K as before. Thus, using the Local Existence Theorem, we can again extend the solution for a time interval of length T2, etc. This shows Let f E C" and E > 0. The 1-periodic Cauchy problem Theorem 4.2.2. (4.1.1) has a unique solution u E C" defined for 0 5 t < 03. It remains to prove the a priori estimate. The proof is based on the maximum principle.
Lemma 4.2.3. Let u E C" solve (4.1.1) in 0 I t 5 T . Then lu(.,t)l, I Iu(.,O)l, for 0 I t 5 T. Proof. Let satisfies (4.2.2)
Q
> 0 be a constant and set u ( x ,t) = e - a f u ( x ,t). The function u ut = uv,
+ EV,,
- QU.
133
A Nonlinear Example: Burgers' Equation
FIGURE 4.2.1.
Restarting process.
Fix T > 0 and assume that ~ ( xt) ,attains its maximum over
OLtIT
xER. at
( 2 0 , to)
with v(xo,to)
> 0. If 0 < to 5 T then
vt(xo,t o ) 2 0.
U,(xo,
t o ) = 0,
l~,.,.(xo,t o )
I 0.
in contradiction to (4.2.2). Thus to = 0, i.e., a positive maximum can only be attained at t = 0. Similarly, a negative minimum can only occur at t = 0. Therefore, Iv(.,t)(,
and if we let a
+ 0,
5
12~(.,0)1,
for t 2 0 ,
then the corresponding estimate for u follows.
Proof of Theorem 4.2.1. The basic energy inequality d
-dt 114
= -2fIl~lIII0
implies that
For the function
gives us
UI
= u,, the equation
134
Initial-Boundary Value Problems and the Navier-Stokes Equations
Therefore, (4.2.4) gives us bounds for rT
(4.2.5)
independent of T. This finishes the proof of Theorem 4.2.1. Remark. To obtain all-time existence, we only needed an a priori estimate for IluIIH2.The reason is that the time interval of the Local Existence Theorem 4.1.7 depends on IlfllH2 only, and does not depend on bounds of higher derivatives of f . Nevertheless, one can ask for a priori estimates of higher derivatives llujII, j 2 3, in terms of IlfIIH,. These can indeed be derived. Just note that
135
A Nonlinear Example: Burgers' Equation
We can make an induction argument using bounds for 1Iuj-1I(* and E
so T
lluj
dr.
4.3. Generalized Solutions for Burgers' Equation and Smoothing* We have shown that the 1-periodic Cauchy problem ut
= UU,
(4.3.1)
+
€
u(z,O) = f(z).
u,,;
f
E
> 0;
E C",
has a unique C"-solution u ( z ,t) existing for all times t 2 0. In this section we first define a generalized solution for any initial function
f E LI!
f(z)= f(z
+ 1).
For example, f could be piecewise continuous with finitely many jumps. Afterwards, we show that the generalized solution is always Cm-smooth for t > 0 i f f E L,.
4.3.1. Construction of Generalized Solutions Let f, g denote 1-periodic C"-functions. solutions u and u of
+ ut = uu, + = uu,
Ut
We estimate the difference of the
E'IL,,,
u ( z ,0) = f(.),
EU,,,
u ( z , O ) = g(z),
in terms of f - g. It is convenient to work with the L~-norm
The difference w = u - v satisfies the linear equation 1 wt = - ( ( u 2
+
2 w ) r
+ ew,,,
*This section might be omitted on the first reading
W ( t , 0) =
f(z)- g(.c).
136
Initial-Boundary Value Problems and the Navier-Stokes Equations
The key result is
Lemma 4.3.1. with
Let a = a ( x ,t ) . w = w(x. t ) denote 1-periodic C””-functions
+
wt = (aw), tw,,.
Proof. 1 ) To obtain smooth approximations to the sign function, we choose a fixed function Sgn E C1with Sgn(y)= - 1
for y 5 - 1 ,
Sgn(y)= + 1 Sgn’(y)
Sgn(0) = 0.
for y
2 o for all y.
Sgn(y) A
-1
+1
-
Y
FIGURE 4.3.1. Approximation for the sign function.
Then we set sgn,(y) = Sgn (Y/@, For 6
+
and thus
Y E
R, 6 > 0.
1
for y > 0,
0
for y = 0,
0 we have that sgn,(y)
-+
2 1,
sgn y =
137
A Nonlinear Example: Burgers’ Equation
Therefore, we have expressed lwll approximately as an integral of a smooth function. This is the main technical point of the proof. 2) For 6 > 0 we find that
where
1‘
sgn,,(w)wt dx =
I’
=-
sgn,(w)(aw), dx
1 1
+c
I
I’
sgnL(w)w,aui dz - t
sgnb(w)w,, dx ~gnL(w)(w,~)* dz
1
5
-
sgnL(w)u?,aui dx.
Therefore
Here b = w t- aw, is independent of 6. Integration from 0 to t yields
and we send 6
-+
0. The left-hand side converges to lW(~,~)Il - IW(.:O)II.
The integrand R ~ ( Tof) the right-hand side is (4.3.2)
If w(z, T ) # 0 then sgni (w(z, T ) ) + 0 as 6 + 0. Thus the integrand of (4.3.2) converges pointwise to zero as 6 + 0. Also, sgni(w)w = Sgn’ (w/6) (w/6) is bounded independently of 6 and x, because the (fixed) function y -+Sgn’(y) y is bounded. Therefore, Lebesgue’s Dominated-Convergence Theorem yields R ~ ( T+) 0 as 6 -+0 for each T . The convergence Rb(T)
dr
-+
0 as 6
-+
0
follows by another application of Lebesgue’s theorem and finishes the proof of the lemma.
138
Initial-Boundary Value Problems and the Navier-Stokes Equations
Remark. A different proof could be given, which uses a monotonic difference scheme. This proof would not require Lebesgue’s theorem. The estimate shown in Lemma 4.3.1 allows one to obtain generalized solutions of
for nonsmooth initial functions f by the usual approximation process: Let
= f(. + I),
f E LI, f(.,
and approximate f by 1-periodic C”-functions f(”):
’”‘fI
- f l l + 0.
If u(”)(z, t) denotes the solution for initial data u(”)(z, 0) = f(”)(z) we have
(u(”)(.,t) - u(~)(.~t)l~ 5
If(”)
- f(fi’ll
+
o
as v, p
+ 00.
Thus, u(”)(., t) + u(.,t) with respect to I . 11; the limit function u is independent of the specific choice of the approximating sequence f(”).By definition, u is the generalized solution of (4.3.3).
Remark. Let us note another application of Lemma 4.3.1. Suppose u = u, solves (4.3.1), and set w = u,. Differentiation of (4.3.1) yields
+
wt = (uw),
EW,,.
Hence, we can apply Lemma 4.3.1 and obtain that I.,(.,t)Il
5
lUX(.,O)lI
= IfZll!
t 2 0.
This €-independent bound of the LI-norm of u, = u,, is the key estimate to obtain a weak solution of the inviscid (E = 0) equation by a compactness argument. We will not present the details, however.
4.3.2. Smoothing for Burgers’ Equation We want to show that the generalized solution u ( z ,t ) defined above is a C”function for t > 0 if f E L,. This is remarkable and not self-evident from linear theory. To show smoothing for parabolic linear equations, we used the smoothness of coefficients. In the present case we could think of u as solution of the linear equation ut = flu,
+ EU,,
A Nonlinear Example: Burgers' Equation
139
with a(z. t ) = u(z.t ) , but the coefficient a ( z ,t) is rough initially. To obtain smoothness of the generalized solutions, we first show estimates of derivatives of u in terms of the maximum norm of the initial data u(.,0) = f where f E C". We remind the reader of the maximum principle
l4.,t)l,
L If. , 1
t 2 0,
and the notation u3 = d J u / d x J . For any interval 0 5 t 2 T and any j = 0. 1, 2.. . . there exists a constant C = C ( j ,E , If lcyl,7') with
Lemma 4.3.2. (4.3.4)
t' lluJ(., t)1I2 2 C. 0
t 2 T.
The constant C does not depend on bounds for derivatives o f f . Proof. Recall the basic energy inequality
which implies that
140
Initial-Boundary Value Problems and the Navier-Stokes Equations
and therefore,
Clearly, this process can be continued and the lemma follows.
We have established bounds for the L2-normsof all derivatives uj= djulL/dxj in terms of Applying the Sobolev inequality of Lemma 3.2.5, we find bounds for uj in maximum norm, and - using the differential equation to express time derivatives by space derivatives - we obtain that
.,lfI
The constant does not depend on derivatives of f , but only on If],. we have assumed that f E C”. Now let
f
€
Lo31 f ( .
Thus far
+ 1) = f ( x ) , +
and approximate f by a sequence f ( ” ) E C“, f ( ” ) ( x )= f(”)(z l ) ,
All derivatives Id”+qu(”)/dxpdtqlare bounded independently of v in 0 < r 5 t 5 T . This shows that the limit function u is Cm-smooth for t > 0. Also, the derivatives of u(”)converge pointwise to the corresponding derivatives of u for t > 0. We summarize:
Theorem 4.3.3. Burgers’ equation (4.3.3) has a 1-periodic generalized solution u = u(x,t )for each initial function
For t > 0, the solution u is C,-smooth pointwise.
and satisfies the differential equation
141
A Nonlinear Example: Burgers’ Equation
4.4. The Inviscid Burgers’ Equation: A First Study of Shocks The viscous equations* (4.4.1)
ut
+ uu, =
FU,,,
u ( z ,0 ) = f(.),
t 2 0,
E
> 0,
f E C“.
f(.
+ 1) = f(.),
have unique C”-solutions u = u c ,existing for all time t ing inviscid equation (4.4.2)
ut
+ uu, = 0,
71(2,0) =
2 0.
The correspond-
f(.)
shall be treated as the limit of (4.4.1) as F + 0. The viscous solutions u,, E > 0, are uniformly smooth in some interval 0 5 t 5 T , T > 0 independent of 6, as shown in Section 4.1. Thus we can send E -.+ 0 and obtain a smooth solution u of the inviscid equation in the same time interval. (Indeed, if u = u,, , 71 = u C z , then we can argue as in the proof of Lemma 4.1.1 and show that IIW(.,
+ €2).
t)ll = O ( € ,
uj = u,,
-
ur2, O < t < T .
Then, by Appendix 4, convergence u, + u follows.) According to Lemma 4.1.1, this limit u is the unique classical solution in 0 5 t 5 T . It is natural to ask whether the functions u,(z,t) converge for all t 2 0 and whether we can extend the smooth solution u ( ~ . tfor ) all times. Both questions have indeed affirmative answers. However, the smoothness of the solution 11 breaks down, in general, at a certain time Tb, at which one or several shocks form. This will be proved below using the method of characteristics. In gas dynamics one treats systems of equations which exhibit a similar mathematical structure as the inviscid Burgers’ equation. In view of these applications, it is desirable to extend the solution u beyond the time Tb, but this is possible only as a nonsmooth function. Of course, the concept of a nonsmooth solution of a differential equation requires some explanation. Concerning this question, we will restrict ourselves to Burgers’ equation, and will first treat the special case of limits of traveling waves. Afterwards, in Section 4.4.3, we discuss more general piecewise smooth weak solutions.
4.4.1. A Solution Formula via Characteristics Suppose u = u ( z ,t ) is a smooth function solving *We alter here the sign of the uu,-term; this corresponds simply to the transformation -I + --I. The nonlinear term appears now with the same sign as the convection term in the Navier-Stokes equations.
142
(4.4.3)
Initial-Boundary Value Problems and the Navier-Stokes Equations ut
+ uu, = 0,
u(x,O)= f(.)
in 0 5 t 5 T. We can consider u ( x ,t ) = a(x,t ) as a coefficient in (4.4.3) and u as the solution of ut au, = 0. This suggests applying the idea of characteristics discussed for linear equations in Section 3.3. Accordingly, we call
+
( z ( t )t,) . 0 5 t 5 T , a characteristic line of the equation ut (4.4.4)
+ uu, = 0 for the specific solution u, if
dx
dt ( t ) = ~ ( x ( tt)) ,, 0 5 t 5 T
This agrees completely with the definition for the linear equation ut + au, = 0 if a = u. (In the nonlinear case, the characteristics depend on the solution under consideration, however.) As in the linear case, it follows that u is constant along each characteristic: d dx - u ( x ( t ) ,t ) = u,ut = u,u + ut = 0; dt dt
+
i.e., u ( r ( t ) ,t) = f ( q ) if x(0) = 20. Now (4.4.4) implies that the characteristic ( ~ ( tt)) ,is a straight line:
x ( t ) = zo
+ tf(xo).
We have shown
Lemma 4.4.1. (4.4.5)
Suppose u solves ut
+ uu, = 0 ,
u(z,O)= f ( x ) .
Then
(4.4.6)
u(xo + t f(xo).t ) = f ( x o ) , 20 E R,
in any t-interval 0 5 t 5 T where
is smooth.
Note that this result is completely independent of spatial periodicity. Henceforth we drop the periodicity assumption and consider (4.43, where f E C” is a given function with
We can use the formula (4.4.6) to obtain a solution u = u ( x , t ) as follows: Suppose z E R, t 2 0 are given and suppose that there is a unique xo E R with
143
A Nonlinear Example: Burgers' Equation
Then define u ( ~ , t= ) f(zo). Let us explain why u solves (4.4.5). First note that, since f is bounded, the equation (4.4.7) always has at least one solution 20. If there are two different solutions 20 and al,then
Thus, if we let
.={"
--
if f ' ( < ) 2 0 for all <, otherwise,
I
then (4.4.7) has a unique solution so = ao(s.t)for given a E R. 0 and consequently the function (4.4.8)
U(.C,
t ) = f ( z o ( a ,t ) ) ,
E
5 t < Th.
R, 0 5 t < T h .
is well-defined. By the Implicit Function Theorem (see below), it follows that ao(z,t) is Cm-smooth. Assuming this is known, we prove now that (4.4.8) solves the inviscid Burgers' equation.
Lemma 4.4.2. The C"-jknc.tion classical solution of (4.4.5).
u = u ( x . t ) defined
by (4.4.8) is the unique
Proof. It is clear that ao(r,O) = a, and thus u(s.0) = f ( a ) . To show that ut uu, = 0, we differentiate
+
so
+ tf(s0)= z
with respect to z and t , and find that
+ tflZo.C = I , zot + f + f f ' s o t = 0. Hence zoS(1 + tf') = 1. zot(1 + t f ' ) = -f, and therefore, zot + faox = 0 (note that 1 f ff' # 0). zor
Thus the definition U ( T . t) = f ( z o ( r t)) . gives us ut
+ UU,
= f/.rOt
+ ff'zoz = 0.
For completeness we state the
Implicit Function Theorem. Let U c R". V c R"' be open, and let F : UxV R"' be a Cp-function, p 2 1. Let a0 E U. bo E V and assume that --f
F ( Q , bo) = 0 and Fh(ao, bo) is nonsingular.
144
Initial-Boundary Value Problems and the Navier-Stokes Equations
(Here Fh is the Jacohian matrix of F w.r.t. the b-variahles.) Then there exists an open neighborhood UOof ao, and a unique CJ’-function g : Uo + R”l with .9(ao) = bo and F(a.g(a))= 0 for all a E Uo
Roughly speaking, the equation F ( a , b ) = 0 defines b implicitly as a function of a , b = g(a), and g is (at least) as smooth as F . This result applies to the previous situation with 71 = 2. nz = 1, and
F ( z . t , b) = b
+ t f ( b ) - z,
a = ( 2 ,t ) ,
< t < Th,
-6
zE
R,
in the neighborhood of any point
and shows that
20
depends smoothly on (x,t). Here
Fh(z, t. b) = 1 4- tf’(b) # 0,
-6
< t < Th
is essential. Let us illustrate the solution formula (4.4.8): If f’(<) 2 0 for all <, then zo < 2 1 implies f(zo)5 f(zl);thus the characteristics (4.4.9)
(50
+ tf(zo),f),
(21
+ tf(Xl),
f).
t20
never cross. We have T h = 00,and a smooth solution exists for all time t 2 0. On the other hand, if f’(<)< 0 for some <, then there are values zo
< 51 with f(zo)> f h )
and the characteristics (4.4.9) cross. The solution steepens up with time. The time Tt, is finite. We cannot extend the solution u beyond T b as a smooth solution. See figures 4.4.1 to 4.4.3. 4.4.2.
Traveling Wave-Solutions for Burgers’ Equation
Before we discuss the extension of the inviscid solution u as a nonsmooth function, let us study explicitly some simple solutions of the viscous equation. We start with the steady state problem (4.4.10)
-€q5,rr
+ q5q5.r = 0.
-00
< 5 < 00,
under boundary conditions (4.4.1 1 )
lim &x) = a ,
.r---cx,
lim q5(z)= -a.
.c-’x;
145
A Nonlinear Example: Burgers’ Equation
t
X
FIGURE 4.4.I .
Characteristics for f(x) increasing.
4.4.2. Crossing characterictics. FIGURE
U
I
XO
FIGURE 4.4.3. Solution steepens up.
Initial-Boundary Value Problems and the Navier-Stokes Equations
146
If 4(z) is a solution, then so is the translated function 4(z constant c. To fix the constant, we require that
+ c) for any real
0)= 0
(4.4.12) and prove
Theorem 4.4.3. given by
I f a 2 0 the problem (4.4.10)-(4.4.12) has a unique solution
(4.4.13) Ifa
< 0 there is no solution.
Proof. First suppose q5 is a solution. Integration of (4.4.10) yields 1
-~4,+ -4’
(4.4.14)
= const.
2
It follows that either 4 is constant or 4x(z)# 0 for all z. The monotonicity of q5 and (4.4.11) imply that 4, tends to zero as 2 -+ f o o . Thus we can replace the constant in (4.4.14) by a2/2:
1 - a’). 2 Clearly, if a # 0, then 4,(0) < 0, and therefore 4 is decreasing. The boundary conditions (4.4.1 1) can only be fulfilled for a > 0. The 0.d.e. (4.4.15) with initial condition (4.4.12) has a unique solution, and by separation of variables one amves at formula (4.4.13).
€4, = - (4’
(4.4.15)
t
The stationary profiles (4.4.13) are shown in figure 4.4.4. In the limit as + 0, the functions d(z) approach a jump discontinuity. Now consider the time dependent problem
(4.4.16)
ut
+ uu,
= EU,,
under boundary conditions (4.4.17)
lim u(z, t) = b
X+-%
> c = 2-cx: lim
u(z,t ) .
We use an ansatz u ( z , t ) = 4(z - s t )
with a constant wave-speed s. It leads to
+ -21( b + c )
147
and the differential equation (4.4.16) requires
If we set the wave-speed 1 s = -(b 2
+ c),
then we obtain the previous stationary differential equation for 4. The boundary conditions for 4 are those given in (4.4.1 1) with a = ( 6 - c)/2. We have shown
The time dependent problem (4.4.16), (4.4.17) has traveling
Theorem 4.4.4, wave-solutions
~ ( 2 t ),=
For
6
1
4 ( -~ st) + -(b 2
+ c),
+ c).
2 + 0 these solutions converge to the piecewise constant function
6
for x
< st,
c
for x
> st.
uo(2.t ) =
4.4.3.
I s = -(b
Weak Solutions of the Inviscid Burgers’ Equation
The inviscid equation (4.4.18)
Ut
f
+ uuL,= 0, €
C“,
W(2,O)
Ifl, < 00.
= f(.).
lf/lx < 00,
148
Initial-Boundary Value Problems and the Navier-Stokes Equations
FIGURE 4.4.5. Limit of traveling waves.
has a unique smooth solution u = u(z,t) only in 0 5 t < 7'0. Here Tb is finite unless f'(<) 2 0 for all <. This result has been shown in Section 4.4.1. We now broaden the solution concept and first define weak solutions. To this end, let CF denote the set of all test functions 4 = 4(z1t ) , (z, t ) E R2: C r = {4 E C" : there exists K = K4 with 4(z, t) = 0 for 1x1 + It1 Suppose u is a classical solution of (4.4.18) and 1
ut4 + $),4 over
-00
4 E C r . If
> K }.
we integrate
=0
< z < 00, 0 5 t < 00, then integration by parts gives us dz dt
(4.4.19)
+
7
f(z)#(z, 0 )dz = 0.
-"
0 --oc
The double integral makes sense even if u is not smooth. We make the
Definition. A bounded measurable function u = u(x,t) defined for z E R, t 2 0, is called a weak solution of (4.4.18) if equation (4.4.19) holds for all
4 € ccy. Clearly, we have broadened the solution concept. Using the solutions uc of the viscous equation and sending c 0, one can show that there always exists a weak solution. It turns out, however, that weak solutions are not uniquely determined by their initial data. Before discussing these issues further, we ask for conditions characterizing a piecewise smooth function as a weak solution. First note: If u is a weak solution, --f
149
A Nonlinear Example: Burgers’ Equation
which is smooth in a neighborhood U of a point (zo,to),then u satisfies the differential equation ut uuZ = 0 in the usual sense at ( L O , to). To show this, we take an arbitrary 4 E C r with support in U and find that
+
0=
7T(u@~
1 + -u2@,)dxdt =2
0 --x
s
(ut
+ uu,)@dxdt;
11
+
thus ut U U , = ~ 0 in ( L O ,to), since 4 is arbitrary. Next assume there is a smooth line (parametrized over time)
r:
(4.4.20)
to ~t
(s(t1.t).
5 tl,
and that the weak solution u has a jump discontinuity along right limits are assumed to exist:
-
ul ( s ( t ) t, ) := lim .r
s(f ) -
r.
The left and
u ( z ,t ) ,
and we suppose that these limits depend smoothly on t. Except for this jump, we assume that u is smooth in a neighborhood of r. Taking a test function 4 with support in a neighborhood U along r we find that
The integrals over U, and U , on the right-hand side vanish, and therefore
=
/{
1 2
4 (ul - u,.)s’(t)- -(u:
- u;.)
to
Since
4 can take arbitrary values along r, it follows that
(4.4.21)
(Ul
‘
2
- u,)s’(t) = -(u,
2
-
2 u,.).
150
Initial-Boundary Value Problems and the Navier-Stokes Equations
1
FIGURE 4.4.6.
Discontinuity curve.
This is a special case of the so-called Rankine-Hugoniot jump condition, which relates the shock speed s’(t) to the states ul and u, of u along the shock line: 1 (4.4.22) s’(t) = -(ul U L , ) ( S ( t ) ,t ) . 2 A particular case of this condition occurred already in Theorem 4.4.4 for the limit of traveling waves. In that example the shock speed s was given by s = (1 /2)(b c). Thus far, we assumed that u is a piecewise smooth weak solution and that the initial function f(x) is smooth. However, i f f is only piecewise smooth, we obtain the same result. Conversely, reversing the arguments given above, one can show that a piecewise smooth function u is a weak solution of (4.4.1) if
+
+
(a) the initial condition u ( z ,0) = f(z)is satisfied at the points of continuity off; (b) the differential equation is satisfied in the pointwise sense in all regions of smoothness of u; (c) the jump condition (4.4.22) is satisfied along the lines of discontinuity of u. We summarize:
Theorem 4.4.5. Suppose u is a piecewise smooth function with jump discontinuities along finitely many smooth lines. Then u is a weak solution of (4.4.18) if and only if the conditions ( a ) ,(b), ( c ) above are met.
151
A Nonlinear Example: Burgers’ Equation
Example 1.
(A propagating shock.)
f(x) = 1 for rc < 0,
FIGURE 4.4.7.
f(x) = 0 for IC
> 0.
Discontinuous initial function.
FIGURE 4.4.8. Propagating shock.
Here 1
1
for rc < - t , 2
0
for rc
u ( z ,t ) =
1 2
> -t.
+
is a weak solution. The shock speed s = 1/2 = (1/2)(ul u,)fulfills the jump condition (4.4.22). This solution is a limit of traveling waves; compare Theorem 4.4.4.
152
Example 2.
Initial-Boundary Value Problems and the Navier-Stokes Equations
(A rarefaction.)
f(x) = 0 for x < 0,
f(r) = 1 for
T
> 0.
f(x) 1
1 -
X L
t
x=t
u=x/t
//
/
/
t Here the characteristics starting at t = 0 do not enter the region
" >
(~,t):O<-
.
If one uses an ansatz
u(s.t)= T
(;).
then the differential equation requires that 0 = ut + u u , = - r t
X
0
< 1.
153
A Nonlinear Example: Burgers' Equation
and one obtains X
u(.,t)=
-,t
o < -.xt < 1.
as a smooth solution in R, which connects the constant states u=Oforr
u = l for.c>t.
This solution is called a rarefaction wave. The discontinuity at t = 0 is resolved instantaneously.
Example 3.
(A pulse.)
f ( r )= 1 for 0 < .T
FIGURE
4.4.1 I .
< 1,
f ( z )= 0 otherwise.
Initial pulse.
uel
X
FIGURE 4.4.12.
Rarefaction and shock.
154
Initial-Boundary Value Problems and the Navier-Stokes Equations
At time t = 2 the rarefaction wave z/t starting at z = 0 catches up with the shock wave starting at z = 1. We can use the jump condition (4.4.22) to determine the location s ( t ) of the shock for t 2 2: The equation / 1 s(t) s ( t )= - -, 2 t
s(2) = 2
is solved by s(t) = & t ' / 2 .
In these examples we have used the characteristics, the jump condition, and the form of a rarefaction to construct weak solutions. Unfortunately weak solutions are not unique. This follows from Example 4.
(A non-physical shock.)
f(x) = 0 for z < 0,
f(z) = 1 for .r
> 0.
Thus we take the same initial condition which led to the rarefaction wave of Example 2. The function
is a piecewise smooth weak solution since the conditions of Theorem 4.4.5 are met. Examples 2 and 4 describe two weak solutions to the same initial function.
/
us0 I
Il U l l I
t FIGURE 4.4.13. Non-physical shock.
I
I
I
I ,,
II
!
+
X
155
A Nonlinear Example: Burgers’ Equation
Which solution should be preferred? There are two reasons why the shock solution of Example 4 is unphysical: 1) It is not true that two characteristics meet at the shock. 2) The solutions u, of the corresponding viscous problem converge to the rarefaction wave and do not converge to the shock solution of Example 4.
We do not prove the second statement here. The result is plausible, however, since we have shown in Section 4.4.2 that there are no traveling waves for E > 0 which are increasing in 2; the shock solution of Example 4, however, corresponds to such a wave for E = 0. Let us now outline the results for the general case. The viscous problems ut
+ uu, =
€UZX.
u(z,O)= f(2),
Ifl, < 03, 1 . k < have unique smooth solutions u6 for all t > 0. These exist for all time. f €COO
7
(We have shown this for periodic f. The present case can be treated as the limit where the period tends to infinity.) If 4 is any test function, it follows that (4.4.23) c/* 0
7
ufq5,,dxdt = -
-03
77
(Uf4t
0
+ ~1 u 1 4 rdx) dt -
-32
s
f(z)&z,0)dz.
-,
Using a compactness argument for u t , one can show that there is a sequence t = c k and a bounded measurable function u with u f ( z .t ) -+
u(5,t) as
t
= ck
-
0.
(Compare the remark at the end of Section 4.3.1.) The convergence holds pointwise almost everywhere. By the maximum principle, the functions uc are uniformly bounded. Thus the integrals in (4.4.23) converge as c = Ek -+ 0, and one obtains (4.4.19); therefore the limit u is a weak solution. This shows the existence of weak solutions. As we have seen, weak solutions are not unique. However, if one considers only piecewise smooth weak solutions and requires that (4.4.24)
UI(.C,
t ) > 21742,t )
at each discontinuity, then - in this restricted class - weak solutions turn out to be unique. Condition (4.4.24) is a plausible requirement at each shock: The characteristic speed should be larger to the left of the shock than to the right. For practical purposes, one can restrict attention to piecewise smooth weak
156
Initial-Boundary Value Problems and the Navier-Stokes Equations
solutions. The physically relevant one is characterized by (4.4.24). This weak solution is the limit (almost everywhere) of the viscous solutions u, as E -+0. Roughly speaking, one has the following picture: The physically relevant weak solution u of the inviscid equation is a piecewise smooth function. The shock speeds are governed by the Rankine-Hugoniot condition (4.4.22). The function u jumps downwards if one crosses a shock from left to right. For small E > 0, the viscous solutions u, are uniformly close to u away from shocks. The convergence is of order O ( E )as E + 03. In a small neighborhood of the shocks, the viscous solutions behave like traveling waves connecting the state ul(z,t ) with uT(z,t).
Notes on Chapter 4 Burgers‘ equation has been discussed in many books; for example in Whitham (1974). We have discussed the estimates in detail because the same procedure can be used - as we will see - in very general situations (systems, many space dimensions). One can make the global estimates more precise and prove ( d P u / d ~ ~ I=, O(6-P). E. Hopf (1950) discussed the properties of the solutions of Burgers’ equation by transforming the equation into the heat equation (Cole-Hopf transformation). In particular, he proved that the solutions converge for 6 + 0 to a weak solution of the limit equation. The solutions of parabolic equations
+ bw, + cw,
wt = aw,,
a > 0,
have the property that the number of sign changes does not increase with time; see Matano (1982), Protter and Weinberger (1967). This can be used to obtain very precise information about the solutions of Burgers’ equation ut
+ uu,
= cu,,,
u(z,0 ) = fb).
The derivative v = u, satisfies vt
+ uv, +
2
21
= w,,,
v(z,O) = fx(z).
Assume first f, 2 0; then v 2 0 for all times, and d
- (max v) 5 -(max v ) ~ .
dt
I
2
Thus the solution u “becomes flat”, i.e., we have a rarefaction. If f, 5 0 then d 2 -(max Jvl) 21 (max (vl), dt x X
157
A Nonlinear Example: Burgers’ Equation
provided we can neglect the viscosity term. This is the case if IvI << 6 - ’ . Therefore, the solution u “steepens up”. When 1 ~ N1 c - ’ , the viscosity term stops the growth of IvI, and we obtain a traveling wave. If f z has p sign changes then - after some time - the solution u will show at most p traveling waves, separated by intervals where the solution is smooth. All these results can be generalized to equations
+ ( f ( 4 ) r= cu,,.
Ut
In particular, Oleinik (1957, 1959) proved convergence of u for
E +
0 to the
unique weak solution of 4
+ (f(u))z = 0
which satisfies the so-called entropy condition (4.4.25)
df
a ( w ( z ,t ) ) > a(ulL,.(z, t ) ) , 4 u ) = -(u).
du
This condition generalizes (4.4.24). There are no difficulties to prove local existence for the solutions of the Korteweg-de Vries equation ut
+ uu, = 6uzzz.
In fact, one can show global existence (Sjoberg (1973)) because of conservation laws which yield estimates of the derivatives for all times. There is a very large body of literature on the KdV equation. An interesting result is the existence of traveling waves, so-called solitons, which can pass through each other without interacting. This is very surprising because of the nonlinear nature of these waves. For details, see Whitham (1974).
This Page Intentionally Left Blank
5
Nonlinear Systems in One Space Dimension
For Burgers' equation we used an iteration solving linear equations to obtain a local existence result. This technique cames over to first-order hyperbolic, to second-order parabolic and to mixed systems. The important point is again to obtain a priori estimates of the solution and its derivatives; these lead in turn to uniform estimates for the iteration sequence mentioned above. Not to obscure the underlying principles, we shall not consider the most general situation, however, but restrict ourselves mainly to equations Ut
(5.1.1)
+ A(u)u, =
EU,~, E
20
u(z.0)= f(z), f E C",
f(.)
= f(z+ 1)
where A = A(u) is a given smooth matrix function. As before, all (vector- and matrix-) functions are assumed to be real, for simplicity, and I-periodic in z. In Section 5.1 we treat the case where A(u)and all its derivatives are globally bounded. For E > 0, one obtains existence for all time. If the system (5.1.2)
+ A(u)u, = 0
~ l t
is hyperbolic, one obtains short time existence for E = 0. The assumption of global boundedness of A(u) is, in general, not fulfilled in applications. In Section 5.2 we use a simple cut-off technique to treat more general cases and obtain short time existence results if A(u) is smooth in a neighborhood of the initial data.
I59
160
Initial-Boundary Value Problems and the Navier-Stokes Equations
If a finite time TO> 0 is given (To is not necessarily small), how can one decide whether a solution of (5.1.1) exists in 0 5 t 5 TO? As for ordinary differential equations, this problem is often of a quantitative nature. We will sketch in Section 5.3, how asymptotic expansions and numerical calculations can be used to answer the finite time existence question, at least in principle. Finally, in Section 5.4, we discuss a global existence result under more specific assumptions.
5.1. The Case of Bounded Coefficients We first settle the uniqueness problem.
If E > 0 or if(€ = 0 and A(u) = A*(u))then the problem (5.1.1) has at most one classical solution. Lemma 5.1.1.
A priori estimates. We assume in this section that A = A(u)and all its derivatives are globally bounded:
161
Nonlinear Systems in One Space Dimension
ID” A(u)J 5 K , for all u E R7‘.p = 0 , 1 , 2 , ...
(5.1.3)
II / I = p (This assumption, which is very restrictive for applications, will be relaxed below.) As in the uniqueness lemma, the case t = 0 requires an additional assumption, namely hyperbolicity.
Definition.
The first-order system
(5.1.4)
~1
+ A(u)u,. = 0
is called hyperbolic if there is a smooth symmetrizer H = H ( u ) , i.e., a smooth matrix function H ( u ) with
H ( u ) = H * ( u ) > 0. H ( u ) A ( u )= A*(u)H(u). u E R” To simplib the proof below, we will restrict ourselves to symmetric hyperbolic systems where A(u) = A * ( u ) , H
( 5 .I . 5 )
EI
.
Let u = u ( z ,t ) denote a smooth solution of (5.1.1), and let uJ = 9 u / d z J . We first consider the parabolic case F > 0 and estimate u, in terms of the initial data and its derivatives.
Lemma 5.1.2. Assume the solution u = u(x,t ) of (5.1.1) is defined for 0 5 t < T , and the global bounds (5.1.3) hold. For each E > 0 there exists a constant C, = C,(T, 6 ) with (5.1.6)
))u,(.,t)ll
The constant C, depends on
5 C, in 0 5 t < T .
/If, 11.
Proof. Equation (5. I . 1) implies that
5 2 K O l l ~ l llbl II - 2F
5 As usual, this yields
1 E
Ko211~112.
IbI (I2
162
Initial-Boundary Value Problems and the Navier-Stokes Equations
Now we can complete the induction step, and the lemma is proved. Under the global assumption (5.1.3), we have shown a priori estimates of all derivatives of a solution for any given interval 0 5 t < T. The estimates depend on E > 0, however.
Existence results. Existence of a solution can be shown by either using the difference approximation dv,/dt
+ A(v,)D+v,
= ED+D-u,
*Formally, A'(%)is a bilinear map acting an two vectors, A"(u) is a trilinear map acting on three vectors, etc. This calculus is not essential here, however. It is only important that each matrix element of A(u) has bounded partial derivatives of all orders.
163
Nonlinear Systems in One Space Dimension
or by considering the iteration
+ A(u')uS+'
uf"
= E u'"X I
k = 0 , 1 , 2 ,...,
3
z L ~ + l ( X , O ) = f(2),
0
u
( 2 ,t
) = f(2).
Since the time interval 0 5 t < T for the a priori estimate was arbitrary, one obtains global existence. We summarize:
Theorem 5.1.3. Given the global bounds (5.1.3), the parabolic system (5.1.1) has a unique smooth solution u, = u,(x,t ) defined for 0 5 t < 00. Here E > 0 is arbitrary. To treat the first-order system (5.1.7)
Ut
+ A ( u ) u ~= 0, u ( z , O )
= f(x), f E C", f(x) = f(x
+ 1)
we assume symmetric hyperbolicity (5.1.5) and the boundedness assumption (5.1.3). We will show €-independent bounds for the solutions u, of the parabolic equation in some time interval 0 5 t 5 T . Sending E + 0, we obtain a solution of (5.1.7) in this interval.
Theorem 5.1.4. Suppose that (5.1.3) and (5.1.5) hold. There exists a time but independent of T > 0 and a constant C > 0, both depending on 11 f E > 0, with (5.1.8)
I(u,(.,t)llH2
5 C in 0 5 t 5 T .
The symmetric hyperbolic system (5.1.7) has a smooth solution u = u(x,t ) in O
Proof. 1) We fix (5.1.1) g'ives us
E
d -(u, dt
> 0 and write u = u,for the solution of (5.1.1). Equation U)
= 2 ( ~~, t =) - 2 ( ~ , A(u)ul) -
52K0ll4l
For
UI
IIUlII.
= du/dx we have Ult
and therefore
= -(A(dW),
+ €213
EIIUI
164
Initial-Boundary Value Problems and the Navier-Stokes Equations
We now estimate
u2
to close the system. For
212
it holds that
and therefore,
Here
+ It2,
Using Sobolev’s inequality to bound lullm by JIu2II llulII, we arrive at a closed system of differential inequalities for l)u112,llul l l ~ 2 1 1 ~Therefore . the estimate (5.1.8) follows with T and C independent of E .
2) Estimates of higher derivatives follow in the same way from UJt
= -(A(u)ul)J
d
+ fUJ+2,
-dt( u J ‘ u j ) = 2 ( U J , U J t ) 1 2 ( U J + l ,
=
(%+I,
(A(u)ul)J-l)
(A(u)ul)J-l)
(UJ, (A(U)UI)J.
The time interval 0 I t 5 T determined in part 1 of the proof does not have to be diminished. This shows that the solutions u, of the parabolic problem are uniformly smooth in 0 5 t 5 T. The existence result for the hyperbolic case follows if we let E --+ 0.
165
Nonlinear Systems in One Space Dimension
5.2.
Local Existence Theorems
The assumption of global boundedness (5.1.3) is too restrictive for applications; for example, it is even violated for Burgers' equation. In this section we show how to localize the assumptions to a neighborhood of the initial data and how to obtain existence in a small time interval. The basic idea is simple, namely the solution stays close to the initial data, at least for a short time. For a given initial function
f = f(z)E C",
c j.1
= f(.
+ 1)
let
U,, = { u E RTL: lu - f(r)l < 17 for some
L}
denote the q-neighborhood of the initial data. We choose a scalar cut-off function q5 E C"(R") with
4(u) = 1 for u E U l 1 p ,d(u)= 0 for
u $!
U,p.
If A = A(u),A E C"(U,,), is the given coefficient matrix in (5.1.1), then set
The altered systems (5.2.1)
4t
+ A(ii)Gx = Eii,,..
ii(L.0) = f ( s )
satisfy the boundedness assumption (5.1.3). First consider the case c > 0 without structural assumptions on A. By continuity, the solution ii, of (5.2.1) stays in U,,14 for some interval 0 5 t 5 T,. Here iic solves the original system. This shows
Theorem 5.2.1. I f A = A(u)is a C"-function in a neighborhood of the initial data, then the parabolic systems (5.1.1) have unique smooth solutions u = u, in some time interval 0 5 t 5 T,. The time T, > 0 depends on 6 > 0. We add now the (local) assumption of symmetric hyperbolicity: (5.2.2)
A(u) = A*(u) for all u E U?,.
Clearly A(u) = A*(u)holds; thus the €-independent estimates of Theorem 5.1.4 apply to I&. There is a time > 0 and a constant C > 0, both independent of E , with Iiift(z,t)l5
c
for
o 5 t IT ,
166
Initial-Boundary Value Problems and the Navier-Stokes Equations
and thus
( U z t,) - f(.)l
= l&(z, t ) - &(z, 0)l
L Ct.
Therefore, in some time interval 0 5 t 5 T , T > 0, independent of E > 0, the functions ii, solve the original system (5.1.1) and are uniformly smooth. For E 4 0, one obtains a solution of the hyperbolic problem. We summarize:
Theorem 5.2.2. If A(u) satisfies the symmetry condition (5.2.2) in a neighborhood of the initial data, then the problems (5.1.1) have unique smooth solutions u, = u,(z, t )for E >_ 0 in some time interval 0 5 t 2 T . The time T > 0 can be chosen independently of E . Generalizations. It is not difficult to generalize the local Existence Theorem 5.2.1 to parabolic equations (5.2.3)
Ut
= A2(%2 , t , ) u,,
+ Al(U,2 , t ) u, + C(U,2 , t ) ,
where
in a neighborhood of the initial data. Also, more general first-order hyperbolic systems (5.2.4)
H ( v , z , t ) A ( v , zt,) = A * ( v , z , t ) H ( vz,, t ) , H > 0,
can be treated as in Theorem 5.2.2. Finally, we can proceed as in Section 3.4 and obtain results for mixed hyperbolic-parabolic systems
Here A2, Bij, C are smooth functions of u,v , 2 , t and
A2
+ A; 2 261,
6
> 0, HB22 = B&H, H > 0.
One obtains
Theorem 5.2.3. Consider the 1-periodic Cauchy problem for a parabolic system (5.2.3). a hyperbolic system (5.2.4) or a mixed hyperbolic-parabolic system (5.2.5). A unique solution exists in a suflciently small time interval 0 2 t 5 T . The time T depends on the initial data.
167
Nonlinear Systems in One Space Dimension
Application to Nuvier-Stokes. An example of a mixed system (5.2.5) is given by the one-dimensional viscous compressible Navier-Stokes equations:
The system reads in matrix form:
2p+p’
0
0
0
0
0
0
P
Theorem 5.2.3 applies if p > 0, p’ 2 0 and if the initial density p(z,O) is positive. Under the assumption r’ (p ) > 0, the matrix
has the symmetrizer
Thus one obtains a hyperbolic system for p = p’ = 0 , r ’ ( p ) > 0, and Theorem 5.2.3 applies.
5.3. Finite-Time Existence and Asymptotic Expansions In most of the previous results we could obtain short-time existence only; however, in principle we were able to quantify the length of a guaranteed interval of existence. If a good approximate solution uo of our problem is known, then we can rewrite the equation as a problem for the difference u - uo, and can employ
168
Initial-Boundary Value Problems and the Navier-Stokes Equations
the previous techniques to the rewritten equation. In this way, the guaranteed existence interval can often be improved considerably. Example. (5.3.la)
Let us demonstrate the foregoing by the following example: ut
+
2121,
= OU,
f
u(z,O) = f(.),
E C",
f(z)
f(z
+ I),
where Q E R is a given constant. The general techniques yield short-time existence in an interval 0 I t 5 T , T = T(llfllH2). Now suppose (5.3.1b) For
E
f(2) =
1
+
Eg(Z),
0<E
<< 1.
= 0, the problem has the solution
uo(z,t ) = e a t ,
existing for all time; this suggests the ansatz u ( 2 ,t ) = uo(2.t )
+ EW(2, t).
For w one obtains that (5.3.2)
Wt
+ u(iw, +
EWW,
= cY'UJu); W ( Z , O ) = g(2).
It should be emphasized that no terms have been neglected, and therefore, if we obtain existence for U J in 0 5 t 5 T, we also can solve the original problem in 0 I t 5 T. Clearly, the nonlinear term in (5.3.2) is multiplied by the small parameter F. (In generalizations of this example, the value of E is a measure of the accuracy to which uo solves the given problem.) Let us discuss (5.3.2). Proceeding as in Section 4.1.2, we obtain
+ 2a(l'ul,,l12 + 2C111%,1l2
= -5dW,,,
U1.CWZ.Z)
I I~ E [ I W , , ~ ( ~
+ 2 a l l ~ , , ( 1 ~(observe (4.1.5)).
~~I~,1m11~,.C112
Consequently, if y(t) is the solution of d
ZY(G = 2WAt) + 5w3/2(t),
y(0) = JIgz,JJ2,
then U I exists in any interval 0 5 t 5 T where y(t) is bounded. It is, of course, important to note that the nonlinear term y3l2 - which may cause a singularity in y - appears multiplied by E. Explicit discussion shows the following:
169
Nonlinear Systems in One Space Dimension
Case 1.
CL
< 0. If
then y(t) decays exponentially, and thus w exists for all time.
Case 2.
CL
= 0. Now y(t) has a singularity at a time
1 TO = ‘3;)
(if
I I s . ~ ~= I I O(1)).
Thus we have long-time existence for small
Case 3.
rr
> 0. In this case,
E.
y(t) grows exponentially and has a pole at
To = O(l0g -).
1
4.9llII
Again, if llgs.rII = O(1), the blow-up time TB + 00 as --t 0, but the increase of TB with decreasing E is very slow. (In order to obtain long-time existence in this case, the perturbation term ~ ( ( g , .(1, has to be “exponentially” small:
The behaviour of the blow-up times To as functions of E can be predicted on basis of the linearized equation. Linearization of (5.3.1) at uo gives us
4ot
(5.3.3)
+ uo4o.r = a4o.
If o < 0, then 40 decays exponentially; the solution u(x,t) and the approximation u O ( xt) . stay close for all time if the pertubation 6.9 is sufficiently restricted. If c1 = 0, then the solution 4” stays bounded; the perturbation €9will, in general, grow over a long time interval. If o > 0, then $0 grows exponentially; after a short time, the differences between w and uo can be O( 1) unless the perturbation is exponentially small.
Asymptotic expansion. By solving linear problems, one can increase the power of F which multiplies the nonlinearity. Again, we illustrate this for the foregoing example. If
$0
solves
4ot
+ uo4o.r = ado,
4 o ( E , 0) = .9(a).
and we write the solution w of (5.3.2) in the form
170
Initial-Boundary Value Problems and the Navier-Stokes Equations
then we obtain for w l : Wlt
+ (210 + €40)4IX + 6 2 w l w 1 x = ( a
- €40x)WI
- 404o.Z,
u11(2,0)= 0.
Obviously, the nonlinearity is now multiplied by e2. Repeating this process, we introduce w = 40
+ €41+ ... + tp-'qhp-l + €PWP
into (5.3.2). Equating terms of order c0, e l , c2, ..., 6 P - l successivly, we obtain linear equations for 40,..., 4 p - ~If. these are solved, the nonlinear equation for w p can be written down: -Ig-p w p x
Wpt
+
E~"
+
wpwPs= hpwp Fp
where Qp
= uo
+
€40
+ E241 + ... + € P 4 p - I ,
hp = Q - €40~ - c24Ix - ... - ~
P 4 ~ - l , ~ ,
and Fp is also known in terms of 40, . . . , 4 p - l . In this way, we have reduced the nonlinearity to order @ + I ; the solution u has the asymptotic expansion u = uo
+
€40
+ E241 + ... +
€p4p-l
+ €P+IWP.
Generalization. Without going into formal details, we want to indicate generalizations of the previous example. Consider a system
(5.3.4)
ut
+
= P(z,t , U , d / d ~ )F,~
U(Z,0) = f
(~),
where P is a differential operator of any of the forms treated in Sections 5.1, 5.2, and assume the coefficients of P are polynominals in u, for simplicity. Now suppose uo(z,t) is a known approximate solution in some time interval 0 5 t 5 T; more precisely, if we substitute uo into (5.3.4), the equations will be satisfied with small defects:
(Formally, we can define the terms EG,cg by the above equations. The parameter E is introduced artificially in such a way that G = O( l ) , g = O( l).) Then we can view the given system (5.3.4) as a pertubation of ( 5 . 3 3 , which suggests an ansatz u(z,t ) = uo(2,t )
+ € W ( Z , t).
171
Nonlinear Systems in One Space Dimension
For w one obtains:
+
t, d / d ~ ) €P~(x, ~ t , UJ, t. d / d ~ ) ~ G, l+ wt = P~(x, W b ,
0)= s(z).
Here PI and P2 are differential operators whose coefficients also depend on U O ; however, since uo is assumed to be known, this is suppressed in the notation. The operator PI is linear, and the nonlinear part is multiplied by t. If the equation for w is of the type discussed in Sections 5.1, 5.2, we can derive a priori estimates for w . As in the example, the growth behaviour of the solution CI of the linear problem
(5.3.6)
CIt = P,(x, t , a/ax)CI
is crucial. If the solutions of (5.3.6) satisfy
then one can obtain a priori estimates for w of the form
Therefore, if It( is sufficiently small, the solution U J- and thus u - will exist in 0 5 t 5 T. Also, if 40 solves the linearized equation
40t = PI(2,t , a / d ~ ) 4+0 G, 4dz, 0)= dz). then u = uo
+ €40+ O(c2). Higher order asymptotic expansions u = uo + €40 + €241+ . . . + tPq!+I + O(€P+')
can be derived as in the example; the functions 40,. .. , lems.
Remark on numerical calculations.
solve linear prob-
The approximate solution uo can also be obtained through interpolation of numerically computed data vh. It is possible to bound the defects tG, cg defined in (5.3.5) in terms of divided differences of v h ; the latter can be computed. For this reason, if a numerical solution vh is computed in 0 5 t 5 T, and sufficiently many divided differences stay within reasonable bounds, one has an indication that the partial differential equation has a solution in 0 5 t 5 T. A better test is obtained if one repeats the computation with step-sizes
ho
> hi > h2 > ... .
172
Initial-Boundary Value Problems and the Navier-Stokes Equations
If the bounds for the divided differences do not grow for decreasing step-sizes, the defects of the interpolant uo = uk will finally be small enough to ensure existence of a solution of the p.d.e. On the other hand, if the divided differences do grow for decreasing h, one has an indication for blow-up at a time TB < T.
5.4. On Global Existence for Parabolic and Mixed Systems Global (in time) existence theorems for systems
can only be derived under rather special assumptions. However, since we have a local existence and uniqueness result, we can always piece local (in time) solutions together and obtain a half-open maximal interval of existence 0 5 t < TO.Here TOis finite or TO= 03. If TOis finite, then SUP{ Iu(., t)l,
:0
5 t < To}
cannot be bounded. Otherwise we could apply the cut-off technique described in Section 5.2 and use Theorem 5.1.3 to extend the solution beyond TO.For the systems (5.4.1) we thus have the alternative:
Lemma 5.4.1. Either (i) Q smooth solution there is a blow-up time TO< 00 with sup{ lu(., t ) l , : 0 5 t
u
exists for 0 5 t
<
00,
or (ii)
< To) = 03.
Phrased concisely, the lemma states that “the solution exists as long as it stays bounded”. We want to describe conditions which exclude possibility (ii); thus these conditions imply all-time existence. First consider a specific example: (5.4.2) Suppose u = ( v , p ) is a smooth solution. The basic energy estimate follows from
173
Nonlinear Systems in One Space Dimension
and
A(u) = A ( v , p )=
(; :)
of the example (5.4.2) clearly satisfies an estimate of the form (5.4.5)
IA(4l
I ICI ( 1 + 1.)
We will show in the following theorem that estimates like (5.4.3), (5.4.4), (5.4.5) exclude possibility (ii) of Lemma 5.4.1; thus they imply all-time existence.
Theorem 5.4.2. definedfor 0 I t
Suppose that ( 5 . 4 3 holds, and a solution u of (5.4.1) i s
< T < m and satisfies
I~u(.,
(5.4.6)
t)ll I K2- 0 5 t < T ,
(5.4.7)
Then SUP
SUP lu(., t)l, O
Ilu(., t ) l l H ~ and thus
O
are finite; thus u can be extended beyond T . Furthermore, there is a bound )l~(.,t)ll~ I 1K4,
where T.
K4
only depends on
E, h-2,
0I t < T,
K3, and / l u ( ~ , O ) l l Hbut ~ , does not depend on
Proof. Differentiation of (5.4.1) yields I d 2 dt
- -
l l ~ ~ 1 1 I=2 -(w( A ( u ) u 1 ) , )- fllU21I2 =
(u2,A(u)u,)- ~ l l U 2 1 I 2
I Kl(1 + 14m) llwll
IIu211
-6
llu2112
174
Initial-Boundary Value Problems and the Navier-Stokes Equations
To estimate Iulm, we use Lemma 3.2.5,
142 I21141 11211II + lI4l21 and find that d dt
2
I b I )I2 I;K ? (I + 2114 11211 II + 1 .1 2)
+ 2pIIuI
i 2N1(211
11211
1
113,
N =E
)I2 2
K2 I ( I +K2), p =
2 -
E
K? A-2.
If we set
hence (5.4.8)
y'(t)
I w ( t ) + P y 2 ( t ) if y(t> # 0 .
To bound y ( t ) , we fix a time 0 I t < T with y(t)
> 1.
There is to < t with y(t0) = 1. Let TOdenote the largest of these to-values, thus y ( ~ )> 1 for TO< T 5 t. Integration of (5.4.8) gives us
Case 1.
rt
Case 2.
For 0 5
T
< t we have Y ( T ) > 1. Integration of (5.4.8) yields y(t)
I Y(0)
+ (a+ m - 3 ,
and the theorem is proved. In the example (5.4.2), the estimates (5.4.6), (5.4.7) are valid a priori in any interval 0 5 t < T where the solution exists. Therefore, according to the previous theorem and Lemma 5.4.1, the solution exists for all time. Furthermore, since the constants K2 and K3 do not depend on T, the bound K4 derived in the theorem is uniform for 0 I t < 00. In particular, the values of the solution stay bounded for all time: [ u ( . , t ) l m5
K5, 0 i t < 00.
t 75
Nonlinear Systems in One Space Dimension
A special mixed system. We shall now show all-time existence for the mixed hyperbolic-parabolic system
+ uu, + p , = tU,r,.. pi + u,r = 0.
211
E
> 0,
Integration by parts gives us d dt
-{
11412+ llP1I2>= -2~ll%l12.
+ llP<.,t)1I2 5 II~(..0)1l2+ llP(.,O>Il2.
Ilu(d)112
Therefore, by the Sobolev inequality, Lemma 3.2.5,
IT
(5.4.9)
Iul$ dt
I const.
For the first 2-derivatives we obtain d -{11~111’+
dt
llP11I2} = -2(U1,(Wdr)
-2EllU21l2
I 214m I b 1 II I b 2 I I - 2dlu21I2 1
I -t bIL Ibl 112 1
I -t b1L { 1179 [I2
- fllV2112
+ IlPl 112}
- EI1U21l2.
Thus, using (5.4.9), we obtain a bound for
This process can be continued, and existence follows.
Notes on Chapter 5 For local existence theorems there is no essential difference between linear and nonlinear equations. Global existence requires global bounds, however. One such result for parabolic systems is given in Theorem 5.4.2. Others can be found in Smoller (1983) and in Ladyzhenskaya, Solonnikov, and Uralceva (1968). Much less is known for the inviscid case t = 0. We cannot expect
176
Initial-Boundary Value Problems and the Navier-Stokes Equations
global existence. Classical solutions cease to exist beyond a certain blow-up time; see John (1974), Lax (1964), Glimm and Lax (1970). If one can write the equations in conservation form 211
+ ( d u ) ) x = 0.
(.du)).r = N u b , .
then one can introduce again weak solutions. A (not necessarily smooth) function u is a weak solution if
+ 4xg(u)) dx dt +
~mss_*(0t71
JI,
+x
4xx, O)u(x,O)& = 0
for all q5 E Cp. Weak solutions are not unique. Generalizing (4.4.25), Lax (1957) introduced entropy conditions for systems. Glimm (1965) proved that there is always a global weak solution which satisfies these conditions, provided the initial data are sufficiently close to a constant vector. However, it is not known whether the solution is unique. For later results we refer to DiPerna (1985), Liu (1983), and Majda (1984). An important example is the system of conservation laws for gasdynamics: pt
+ (p.L
=0
+ (pu2+ PI, = 0 ( p E h + (pEu + pu), = 0 , (pu)t
E =e
+ -21 u2 .
Here p, u . p, e denote the density, velocity, pressure, and internal energy, respectively. Also, an equation of state which connects p , p. p has to be specified. Many people have studied these equations for the last 150 years using less mathematical machinery. For an account see Courant and Friedrichs (1948), Whitham (1974), and Landau and Lifshitz (1959). Little is known about the behavior of the solutions of (5.4.1) as 6 + 0. However, Gilbarg (1951) proved that the viscous gasdynamical equations allow traveling waves which converge for E -+ 0 to a weak solution of the limit equation. For other results we refer to Smoller (1983).
6
The Cauchy Problem for Systems in Several Dimensions
The results of Chapter 3 about linear parabolic, strongly hyperbolic, and mixed systems can mostly be generalized from one space dimension to an arbitrary number of space dimensions. These generalizations are carried out in the first three sections of this chapter. In particular, we show well-posedness of the Cauchy problem for the linearized compressible Navier-Stokes and Euler equations. Section 6.4 treats short-time existence for nonlinear systems; we carry out the details for the symmetric hyperbolic case and sketch generalizations to systems of different type. For a special class of nonlinear parabolic systems in two space dimensions, we will prove all-time existence in Section 6.5.
6.1. Linear Parabolic Systems We consider second-order parabolic systems of the general form (6.1.1)
ut =
2 I.J=i
Dt(A,,D,u)
+
2
B,D,ir
+ Cu + F.
,=I
Here s is the number of space dimensions and D , is the operator D, = i)/ds, . The coefficient matrices A,, = A,,(z,t), €3, = B , ( z , t ) , C = C ( s . t )and the forcing function F = F ( z ,t ) are assumed to be C”-smooth, real, and 1-periodic
I77
178
Initial-Boundary Value Problems and the Navier-Stokes Equations
in each component xi,i = 1 , . .. , s. The concept of parabolicity will be defined below. For the function u(x,t) an initial condition (6.1.2)
u(z:O)= f(x), f E C",
f I-periodic in each xi
is given, where f takes values in R". As before, we seek a smooth solution u = u(x, t) taking values in R" which is 1-periodic in each xi, i = 1 , . . . , s. In Section 6.1.1 the concept of strong parabolicity will be defined; it leads to a simple derivation of solution-estimates. Existence of a solution can again be shown by proving the analogous estimates for a difference scheme. This will be sketched in Section 6.1.2. Existence, uniqueness, and estimates can be generalized from strongly parabolic systems to systems for which a pointwise definition of parabolicity is used. For our applications this generalization is of minor importance, however, and we only sketch the proof.
6.1.1. Estimates for Strongly Parabolic Systems The following definition generalizes our previous concept of strong parabolicity to systems in any number of space dimensions.
Dejnition. The system (6.1.1) is called strongly parabolic in 0 5 t 5 T if there exists a constant 6 > 0 such that the estimate
i= I
holds for all x E R", 0 5 t 5 T, and all vectors yi E R", i = 1 , . . . , s. The basic result about existence, uniqueness, and estimates is
Theorem 6.1.1. If(6.1.1) is stronglyparabolic in 0 5 t 5 T , then the Cauchy problem (6.1. I ) , (6.1.2) has a unique classical solution u = u(x,t ) in 0 5 t 5 T . The solution u is a Cm-function. For each p = 0 , 1,2,. . ., there is a constant K p with
The constant K p depends on 6 and the maximum norm of the coefficients of (6.1.1) and their derivatives of order 5 p , but not on F, f.
179
The Cauchy Problem for Systems in Several Dimensions
Proof. We start with the estimates. Integration by parts yields I d 2 dt
- - ( u , u ) = ( u ,u t ) S
S
Therefore, (6.1.3) follows for p = 0 if we apply Lemma 3.1.1. This estimate also shows the uniqueness of a classical solution. To estimate first derivatives, we differentiate the equation (6.1.1) with respect to z,, i = 1 , .. , , s , and obtain a system of similar type for the vector
(DIU,D2u,. .. . D,u). The coefficients of this system depend on A , j , B,, C and the first derivatives of these matrices. The desired estimate follows as above. Estimates for higher derivatives are obtained by repeated differentiation.
In the next section we sketch the proof of the existence of
u.
6.1.2. Existence via Difference Approximations Let h = 1/N denote a gridlength, N a natural number. For any multi-index
v = (v1... . ,vs), vj E z. let z, = (hvl , . . . , h ~ , denote ~ ) the corresponding meshpoint. We consider gridfunctions v, = v(z,,) which are assumed to be 1-periodic in each coordinate direction. By EJ we denote the translation operator in the j-th coordinate:
Ejuv = Ejv(z,)= u ( z ,
+ he,),
e3 = (0.... , 0 , 1 , 0 , . . . , 0) with 1 at position j The powers of EJ are
EJPu,, = v(s,
+ phe,),
p E Z,
and EJ”= I is the identity. The forward, backward, and centered difference operators in the 3-th coordinate direction are
180
Initial-Boundary Value Problems and the Navier-Stokes Equations
1 2
DOj = - (D+j
+ D-j),
j = 1 , . .., s .
Using these notations, we approximate (6.1.1) by the system of ordinary differential equations
i=l
If we introduce a discrete scalar product and norm for gridfunctions by
then all computational rules of Section 3.2.2 carry over in an obvious way to the multi-dimensional case. Therefore, we can estimate the solutions of (6.1.4) and their divided differences independently of h. We just mimic the continuous process. As in the one dimensional case, we can interpolate v,(t) = v,h(t)with respect to the z-variables by Fourier polynomials w"(z, t). (See Appendix 2.) These are uniformly (with respect to h) smooth; in the limit h + 0 we obtain a solution u = u ( z ,t ) of the Cauchy problem. There is no essential difference from the one dimensional case. 6.1.3.
General Linear Second-Order Parabolic Systems
In Section 2.4.3 we have defined parabolicity for problems with constant coefficients. Applying this concept to all frozen-coefficient problems, we are lead to: Definition. The system (6.1.1) is called parabolic in 0 5 t 5 T ifthere is a constant 6 > 0 such that for all x E R",0 5 t 5 T , and all w = (wI, . . . ,w,)E Rs the eigenvalues K of the matrix I
satisfy Re
K
2 61wI2.
181
The Cauchy Problem for Systems in Several Dimensions
One can prove
Theorem 6.1.2. The statements of Theorem 6.1.1 are valid if the assumption of strong parabolicity is replaced by the assumption of parabolicity. We only sketch the proof of this result. The essential point is to obtain the a priori estimates (6.1.3); then existence of a solution follows as before by use of a difference scheme. To obtain the estimate (6.1.3) for p = 0, first fix a point (so, t o ) and consider the constant-coefficient parabolic operator s
~ 2 ( 5 n t, o , D )
=
C 1
D , ALJ(so, t o ) D,.
]=I
If we proceed as in Section 2.7 - but replace Fourier transforms by Fourier expansions - we can construct an inner product (u,
to) =
C(a(u), ~ ( z oto, , ~)s(w)) W
with
c 5
(. P2(zo. to. D)u)H(c",t") + (p2(zo,to. O u , . ) H ( s o , t r , ) <- -6
llDL4*
?=I
for all smooth functions u = u(z). Using the corresponding norms and a partition of unity argument as in Section 3.2.5, we obtain the basic energy estimate as before. Estimates for derivatives can be obtained by differentiating the differential equation. As noted in Section 3.2.6, a basic property of parabolic differential operators is their smoothing ability. This smoothing property is also valid for equations in more than one space dimension and can be proved as in the one dimensional case
6.2. Linear Hyperbolic Systems A first-order system
(6.2. la)
ut
= P ( z ,t , d/dz)u
+ C(a,t)u + F ( z .t )
is called symmetric hyperbolic if P ( z . t . d / d z ) has the form (6.2. I b )
c{
1 "
P ( z ,t , d / d x ) = ~2 ,=I
B 3 ( r ,t)D,u
+ D3(BJ(x, t)~)},
182
Initial-Boundary Value Problems and the Navier-Stokes Equations
and B j ( x ,t ) = Bj+(z,t ) for all x , t. As before, the coefficients B j , C , and the forcing function F are assumed to be real, Cm-smooth, and 1-periodic in each Xj.
To obtain existence for the Cauchy problem (6.2. l), (6.1.2), we consider first the parabolic problems ut = t AU + P ( x , t , d / d x ) u + CU+ F,
t
> 0.
The existence result of Theorem 6.1.1 applies, and the estimates are independent of E > 0. For E -+ 0, one obtains a solution of the symmetric hyperbolic problem. A basic property of hyperbolic equations is the “finite speed of propagation”. We formulate the result in the following theorem; the proof uses the convergence of an explicit difference scheme.
Theorem 6.2.1.
Define
The solution-value u(x0,to) depends only on those values of F ( x ,t ) for lying in the cone
1x0 - 21 and only on those values off
I a(to - t ) ,
( 2 )for
05t
( 2 ,t )
I to,
x lying in the interval 1x0 - x(5 ato.
h I
FIGURE 6.2.1. Domain of dependence and mesh.
X
The Cauchy Problem for Systems in Several Dimensions
183
Proof. 1. As in Section 6.2.1, we introduce meshpoints x u , v E Z". but discretize in time also. Let k > 0 denote the time step-size. We approximate (6.2.1) by the difference approximation
( I - k C ( z u ,t ) ) li,(t
+ k ) = ( I + kC(x,, t ) ) v u ( t - k ) + 2kQ(xu, t ) v,At) + 2 k F ( x u ,t ) ,
(6.2.2)
t
= k . 2k. 3 k , . . . ,
Q(xu,t ) t ~ u ( t = )
" 51 C { B j ( r , , t)Doju,(t) + Do] ( B j ( z u ,t)v,(t))} . )=I
Here 1 Doj = -(D+, 2
+ D - j ) = -2h1( E j
I
- Ej- )
denotes the usual centered difference operator. The three level difference scheme (6.2.2) is supplemented by the starting conditions
(6.2.3) ~ ~ (=0f ( )x u ) , v u ( k )= f ( z u ) k { Q(zu.0)
+
+ C(s,. O)}f(x,) + k F ( x U 0). .
+
We fix a relation k = h / ( a q ) , 77 > 0 arbitrary, and send h + 0. The difference equations (6.2.2), (6.2.3) define an approximation t i = uh for the exact solution u, and we will prove the convergence
The domain of dependence of uh belongs to the cone 1x0 - 21
I ( a + q)(to - t ) , 0 I t
I to.
Since q > 0 is arbitrary and u is smooth, the assertion of the theorem follows. 2. It remains to show (6.2.4). First note that the operators Doi are antisymmetric:
184
Initial-Boundary Value Problems and the Navier-Stokes Equations
We give a simple bound for Q ( t ) : The estimate
implies that
L
j=l
The smooth solution u = u ( z ,t ) of the differential problem satisfies
Thus we can consider u,(t) as a solution of perturbed difference equations:
Here $,(t), 9, are bounded independently of h and k . The difference solves
Taking the inner product with m,(t find that
+ k ) + w,(t
-
UJ= u--v
k ) and summing over v, we
The Cauchy Problem for Systems in Several Dimensions
185
This implies a lower bound for L(t),
and therefore the above recursive estimate gives us that
+
U t + k ) I L ( t ) kc&t
+ k ) + kc,L(t) + k(k2 + h 2 ) 2 C 4 .
Hence the auxiliary quantities L ( t ) also satisfy
L(t + k ) 5 ( I
+ k q ) L ( t )+ k(k2 + h 2 ) 2 C 6 .
Initially, at t = k , we have L ( k ) = llw(k)11; = O(k4), and by a discrete analog of Gronwall's Lemma (Lemma 3.1.1) it follows that
L ( t ) = O((k2 + h 2 ) 2 ) , 0 5 t 5 to. Since L(t) bounds
Ilci~(t)ll;~ , the
convergence (6.2.4) is proved.
186
Initial-Boundary Value Problems and the Navier-Stokes Equations
The existence result mentioned above for symmetric hyperbolic systems can be extended to more general hyperbolic equations. Consider the first-order system (6.2.la) where the operator P ( z . t,a/az)has the form (6.2.1b), but the matrices B,(z, t) are not necessarily symmetric. We call s
P(z,t,iw) =
iC
BJ(z,t)wj. w E R", IwI = 1.
J=l
the symbol of the differential operator P and make the The system (6.2.1) is called strongly hyperbolic if there exists a smooth 1-periodic symmetrizer; i.e., there is a 1-periodic positive definite Hermitian matrix function
Definition.
H ( x , t , w ) , z E R". t 2 0, w E R", lwl = 1 , depending smoothly on all variables, with
+
H ( r . t , w ) P ( z ,t , iw) P*(Z,t , i w ) H ( z .t , w)= 0. This definition generalizes the conditions discussed in Section 2.4.1 for the multi-dimensional constant-coefficient case and the conditions in Section 3.3.1 for the one dimensional variable-coefficient case, but it requires in addition smooth dependence on (2, t. w). (In the constant-coefficientcase smooth dependence on w was not essential.) If we require that all frozen-coefficient problems obtained from (6.2.1) be strongly hyperbolic in the sense of Section 2.4.1, then we can use the matrices
S ( s . t . w ) , w E R". IwI = 1 . of Theorem 2.4.1 and obtain the symmetrizer H = S'S; compare Lemma 2.4.2. The only extra assumption in the above definition is the requirement of periodicity and smoothness of H = H ( z . t , w ) . The matrix S - ' ( x , t , w ) contains in its columns the eigenvectors of P ( z .t , iw). Thus, if the eigenvalues of P ( r ,t. iw)are all purely imaginary and if linearly independent eigenvectors can be chosen as smooth periodic functions of ( z , t . w ) , then the system is strongly hyperbolic. This is the case if the system is strictly hyperbolic, i.e., the eigenvalues of P ( z ,t , iw)are purely imaginary and always distinct. One can prove
Theorem 6.2.2. If the system (6.2.1) is strongly hyperbolic, then the Cauchy problem is well-posed. For every set of smooth data F = F ( z . t ) , f = f(x)
The Cauchy Problem for Systems in Several Dimensions
187
there exists a unique smooth solution. Estimates as in the one dimensional case are valid; i.e., the solution is as smooth as the data. Sketch of the proof. We use the theory of pseudodifferential operators and refer to Eskin (1981, Chapter 5) or Nirenberg (1973). To conform with the usual framework, we do not assume that the data and coefficients are 1-periodic. Instead, we assume that F, f E C" and that the coefficients are constant outside a bounded set. Because of the finite speed of propagation, this is no restriction. Let 4j = 4j(T) denote a partition of unity where the support of 4j has diameter dJ and sup, d3 is sufficiently small. Also, at every point T at most p functions #3 are different from zero, p independent of T . We define the pseudodifferential operator H(t) by
For sufficiently small d j
defines a scalar product which is equivalent to the usual Lz-scalar product. To prove this, we define
H,(t)v(c)=
L.
H ( z , , t , W / I C Ja ( ( w) ) dP w , (xJ ~E. ~ ) 4,, support
and note that
This ensures that
can be estimated from below by const 1 1 ~ 1 1 . Let 4 = $(lwl),# E C", denote a "cut-off' function with
We write (at each t )
H=H+HR?
188
Initial-Boundary Value Problems and the Navier-Stokes Equations
where
6(w)dw. With these notations,
+ Re ( u j ,HPuj) = (ujl (HP + P*H*)uj + Re ( q HPuj). , 2
Re ( u j ,HPuj) = Re (uj ,HPuj)
Again, HP + P*H*is a pseudodifferential operator. The calculus of pseudodifferential operators implies that its symbol has the form
4(lwl) (m? w/lwl)P(z,t , iw)+ P*(X,t , i w ) H ( z ,t ,w/lwl)) t l
+ S(Z, t , w). +
The part multiplied by 4 vanishes, and S(z, t , w) is bounded. Hence, HP P*H*is a bounded operator. Because the factor 1 - 4(lwl) in the definition of H cuts off high frequencies, the operator HP *isalso bounded. Therefore one obtains that d (u, dt u ) H ( t ) 5 const ( u !U ) H ( t )
+
(u1
F)H(t):
and the basic energy estimate follows.
6.3. Mixed Hyperbolic-Parabolic Systems and the Linearized Navier-Stokes Equations There are no problems in obtaining existence and uniqueness results, and estimates of smooth solutions for mixed hyperbolic-parabolic systems of the form
~t = P I ( z t, , d
+
+
/ d ~ ) v R ~ [ (tX , d, / d ~ )G~I .
Here we assume that the uncoupled systems
+ G, Vt = P~(x, t ,d / d z ) T + F
Tit = P ~ ( x t ,,d / d ~ ) i i
(6.3.2)
are second-order strongly parabolic and first-order symmetric hyperbolic, respectively. The coupling terms R12 and R ~ are I general first-order operators.
189
The Cauchy Problem for Systems in Several Dimensions
The proof proceeds as in the one dimensional case; we refer to Section 3.4.1. The solutions are as smooth as the data. One can also generalize this result to the case where the uncoupled systems (6.3.2) are second-order parabolic and first-order strongly hyperbolic, respectively. The proof for this more general case requires that one modify the Lznorm to obtain the estimates. We shall now discuss how these results apply to the linearized Navier-Stokes equations. The (nonlinear) viscous compressible system reads p
(6.3.3)
D -u Dt
+ grad p = p A u + ( p + p ’ ) grad (div u ) + pF,
D Dt
+ p div u = 0,
-p
p = r(p),
d d d D - d - - + u - + 2) - + w -. Dt dt dy dz dx
-
Suppose U(x, t ) . P(x,t ) , R(x,t ) are smooth functions with R > 0 and P = r(R); these functions are considered as an exact or approximate solution of (6.3.3). We substitute
u=U+U’,
p=P+p’,
p=R+p’
into (6.3.3) and neglect all terms which are quadratic in the corrections u’, p’. p’. If we drop the ’ sign in our notation, we obtain the linear equations
D RTu Dt
D
(6.3.4)
-
Dt
D + p Dt U = pAu + ( p + p’) grad (div u) + G I
+
K
grad p
+ R(u.
grad)U
d = at-a + u -+v -d + w
7
d dz’
-
dr
K
= -(R),
dP
D -
Dt
p
+ R div u + u . grad R + p div U = G2.
The inhomogeneous terms G I , G2 are determined by U , P, R and vanish if U, P, R solve (6.3.3) exactly. Clearly, the equations (6.3.4) are of the general form (6.3.1) with u = u, 2) = p . For p > 0, p’ 2 0, the second-order operator
pAu
+ ( p + p’) grad (div u) =:
3
AijDiDju i.j=l
190
Initial-Boundary Value Problems and the Navier-Stokes Equations
is strongly parabolic since
Here yi E R3 is arbitrary, and yjz’ is the i-th component of yi. Thus the uncoupled u-equation in (6.3.4) is strongly parabolic as long as R(x,t) is bounded. The uncoupled p-equation in (6.3.4) is symmetric hyperbolic since it is of firstorder and scalar. We consider also the inviscid case p = p’ = 0. Except for zero-order terms and forcing functions, one obtains the first-order system (2.4.2) where U , V, W , R are now (known) functions of ( x , t). The symbol P ~ ( xt, ,iw) equals
v o o o u o R O O
and the symmetrizer is
H ( x , t, w) =
0
o o v O
(i i i i),
R
0
h=tc/R2
Thus the linearized inviscid compressible equations form a strongly hyperbolic system if K = ( d r / d p ) ( R ) > 0. Again, as in the one dimensional case, the symmetrization of the system is equivalent to the introduction of a scaled density.
6.4. Short-Time Existence for Nonlinear Systems Local (in time) existence results for nonlinear strongly hyperbolic, parabolic, and mixed systems in s space dimensions can basically be derived in the same way as in the case of one space dimension. However, the proofs become technically more difficult because the Sobolev inequalities depend on the number s of space dimensions. We first treat nonlinear symmetric hyperbolic systems in
191
The Cauchy Problem for Systems in Several Dimensions
detail. Then corresponding existence results for parabolic and mixed systems are stated.
6.4.1. Nonlinear Symmetric Hyperbolic Systems Consider a symmetric hyperbolic problem
c Y
(6.4.1)
'uf =
Bj(u)Dju, Bj = Bj',
j=l
u(z,O)= fb),f E
(6.4.2)
c-,
f ( ~ ) f(z
+ ej).
As in the one dimensional case, we assume uniform bounds for the (real) coefficients and their derivatives, i.e., 8
C
(6.4.3)
Bj(u)I 5
~
p
p: = 0, 1 , 2 , .. . ,
j=l
for all arguments u E R7L.These global bounds can be replaced by local bounds in a neighborhood of the initial data if one applies the cut-off technique described in Section 5.2. We start with an a priori estimate of 1 1 ~ 1 1 ~ ~ + 2As . it turns out, if this norm is estimated in some time interval, then higher derivatives can be bounded in the same interval. In the proofs we repeatedly use the Sobolev inequality (see Theorem A.3.6) JuI,
S
5 cllullHh if k > -. 2
It implies that
ID'uI,
5 c(IuIJHk if IvI + [s/21+ 1 5 k.
Here [s/2] is the largest integer 5 s/2, and c is a numerical constant independent of u, 2).
Suppose that u solves (6.4.1) in 0 5 t 5 T . Then
Lemma 6.4.1.
where C depends only on the constants KO,.. . ,Ks+2 of (6.4.3). Proof. Differentiation of (6.4.1) yields 9
8
192
Initial-Boundary Value Problems and the Navier-Stokes Equations
where
v = (VI,.. . , v3), cr = ( 0 1 , . ..a,), are multi-indices with a
0’ =
( a ; ,. . . , a;,
+ a’ = v and
c, = (VI!...v~9!)/(al! ... as!a ; ! ...a;!).
Therefore, the time derivative
can be estimated in terms of (6.4.4)
(D”U,Bj(U)DjDVU),
j = 1 ,... , s ,
together with (6.4.5)
)
( D ” u , D n ( B j ( u ) ) D B u, 1 5 la1 5 IvI, IcrI
+
= IvI
+ 1.
The symmetry Bj = B; and integration by parts yield (V,Bj(U)DjV)= -
- (Bj(U)DjU,V),
and thus
To estimate a term (6.4.5), we apply the chain rule and write
Here each C, consists of partial derivatives of the coefficient Bj w.r.t u (and C, acts as an r-linear map on D“’ u . . . Dnru.) According to assumption (6.4.3), the C, are bounded. Consider first the case
la1
+ [s/21 + 1 5 s + 2 .
Then (by Sobolev’s inequality) (6.4.6)
IDuauJ, 5 constlluIIHs+2,
193
The Cauchy Problem for Systems in Several Dimensions
since
[ail
+ [s/2] + 1 5 s + 2. Therefore,
r=l
Secondly, let
+
Jal [s/21+ 1
> s + 2;
thus
1/31 + [s/21 + 1 I s + 2. (Observe that la(
+ 1/31 = IvI + 1 5 s + 3.) Then JD('UJ~
5 const
~lu~~~.+z,
and we find that
If each laL[ is
I s + 1 - [s/2], then (6.4.6) applies; hence 1lD"'u.. . D'ru(( 5 const llullh3+2.
If, say, la1I > s + 1 - [s/2], then all other laL/ satisfy Ja,I< s therefore JJD'lu... D't uII
I llD''ulJ
+ 1 - [ s / 2 ] , and
IDu2uIx,.. . IDu7ulx 5 const
IIU~~L.~+~.
Summarizing, the estimate s+2
is shown, and the lemma is proved. The following result is an immediate implication of the previous lemma.
Corollary 6.4.2. There is a time T > 0 depending on 1) f 1IHa+', but not on higher derivatives of f ,with the following property: If u solves (6.4.1). (6.4.2) in 0 I tI T , then Ilu(.,t ) l l H . + 2
5 211f ( l H s + 2 in 0 5 t 5 T .
194
Initial-Boundary Value Problems and the Navier-Stokes Equations
Proof. If f = 0, then u
= 0. Thus let f $ 0, and suppose that y ( t ) solves
where C is determined as in Lemma 6.4.1. Then (by Lemma 4.1.2)
for some T > 0. We shall now show that all higher derivatives of the solution can be estimated in the same time interval 0 I t 5 T . The existence of a smooth solution is assumed. Let T = T(JlfllH.+2) denote the time of Corollary 6.4.2. For Lemma 6.4.3. every p = 0 , 1 , 2 , .. ., there is a constant M p , depending on 11 f J J H ~ +with ~+~,
Proof. For p = 0 the result is shown. Assuming it is proven up to p - 1, we shall prove it for p > 0. To this end, let lvl = s 2 + p . As in the proof of Lemma 6.4.1, we can bound
+
(D”u,Bj(U)DjDVU) 5 c211D”u(12. It remains to estimate
195
The Cauchy Problem for Systems in Several Dimensions
Case 1.
la1
+ [s/2] + 1 5 s + 1 + p .
Then
( D " ( B ~ ( U )5 ) ( const ~ by (6.4.7),
Case 2.
la(
+ [s/2] = s + 1 + p ;
+ [s/21+ 1 I:s + 2 + p.
thus
Then
I CII~IIH*+~+P,
ID"L and it remains to estimate
all Igil I:s + p - [s/2]. The estimate of (6.4.8) follows by (6.4.7). Case 2a.
10, I > s + p - [s/2l.
Case 26.
Then 01 = a ,
T
, and thus
=1
+ +
-t- [s/2] > s 1 p ; thus In this case IDfluI, I: const by (6.4.7).
Case 3.
IPI + [s/2l+ 1 5 s + 1 + p .
+
all Ioil I:s p - [s/2]. We have bounded the term (6.4.8) in Case 2a. Case 3a.
lolI > s
Case 36.
We cannot have s
1021
+ p - [s/21.
> s + p - [s/2] since otherwise
+ 2 + p 2 la1 2
Thus IDuiuIw, i
101
I + lo21 2 2s + 2p - 2[s/21 + 2.
# 1 , is bounded by (6.4.7), and llD"'.Ull I
I Il'L1IlH.+2+P.
Il~llHl-l
To summarize, we have shown that d dt
- ( D Y u , D U u )5 const
1(u(L((&J+2+pr Iu(
=s
+2 +p .
196
initial-Boundary Value Problems and the Navier-Stokes Equations
If we use the notation
then
and the induction step can be completed. We shall now sketch the proof for the existence of solutions. To this end, we consider the sequence of functions uk = u k ( z ,t ) defined by the iteration
c V
?$+I
=
Bj(Uk)DjUk+l, U k + l ( Z ,
0) = f (z), u q z , t ) = f (z).
j=l
Note that each function u k is determined by a linear equation. In the same way as in Section 4.1.4, we can show the analogues of Lemma 4.1.5 and Lemma 4.1.6. The techniques to obtain the estimates are the same as used in the proofs of Lemma 6.4.1 and Lemma 6.4.3.
Lemma 6.4.5.
For each j = s
+ 3, s + 4 , . . . there exists Kj with
/Id(., t ) l l ~5 > Kj
in 0 5 t 5 TI,
where TI is determined in the previous lemma. As in Section 4.1.4, we can use the uniform smoothness of the sequence 5 t 5 TI and employ Gronwall's Lemma to show the existence of a C"-solution in 0 5 t 5 Tl. Uniqueness of a solution follows as in the one dimensional case: see Lemma 5.1.1. uk in 0
Theorem 6.4.6. Consider the 1-periodic Cauchy problem (6.4. l), (6.4.2). The problem has a unique C"-solution u = u(x,t ) , dejned for 0 5 t 5 T . The time T > 0 depends on 11 f I ( H a + 2 , but not on higher derivatives o f f .
The Cauchy Problem for Systems in Several Dimensions
197
6.4.2. The Compressible Euler Equations
In two space dimensions the equations without forcing read Ut
+ U U , + vuy + -1p , P
v,
+ uu, + uvy + -P1p ,
+ up, + upy + p(us + u y ) = 0,
(;),+(a Pt
= 0,
or in matrix form
f br;))
= 0,
P = r(p).
(,)..(! ; t..) (;) 0
=o.
0
4!
If r ' ( p ) = $ ( p )
> 0, then we can introduce a new density p by
This transformation leads to a symmetric hyperbolic system. In 3D we can proceed in exactly the same way.
6.4.3. More General Nonlinear Systems The local existence result stated in Theorem 6.4.6 can be generalized without difficulties to
Symmetric hyperbolic systems
c 9
u, =
B3(2,t,21)D3U+F(T,t,21),BJ =I?;.
j=1
where BJ and F depend smoothly on all variables. One can also treat
Strongly parabolic systems
c Y
ut
= E
2,3=I
Dz(A,,(~,t))D3u+F(~,D t , 1I M ~,..., . D,u)
198
Initial-Boundary Value Problems and the Navier-Stokes Equations
and obtain an existence interval depending on E > 0. If the system becomes symmetric hyperbolic for c = 0, then an existence interval 0 5 t 5 T, T independent of E > 0, can be established. For E + 0 the solutions of the parabolic problem converge (along with all their derivatives) to the solution of the hyperbolic problem. Proofs of these results have been given in Chapter 5 for one space dimension, but all arguments generalize. Similarly, we obtain local existence for Mixed hyperbolic-parabolic systems Y
=
C
D i ( A i j ( ~t ), Dju)
+ FI(x, t,
U,U,
Du, Du),
i,j=l 9
ut =
1 Bj(x,t,u,u)Djv + F ~ ( xt ,, ~ ,Du), U,
Bj = Bj*.
j=I
Further generalizations to general parabolic systems, strongly hyperbolic systems (with smooth symmetrizers) and mixed systems can be obtained by changing the Lz-norm. We refer to Sections 6.1.3 and 6.2.2. These results establish short-time existence for the compressible viscous or inviscid Navier-Stokes equations. In the inviscid case, the usual assumption of d r / d p > 0 for the equation of state p = r ( p ) is required to ensure hyperbolicity.
6.5. A Global Existence Theorem in 2D To begin with, we consider a parabolic system where the first-order terms are in so-called self-adjoint form:
(In this section E is arbitrary but fixed.) As before, we assume an initial condition (6.5.2)
u(x,y,O) = f(x,y), f E C",
f 1 - periodic in x and in y.
According to Section 6.4, there is a time T > 0 and a C"-solution u defined for 0 5 t < T. We use the notation
q t ) = IID$L(.,t)112 + IlD;u(., t)112, and start with a simple a priori estimate.
j = 1 , 2 , .. . ,
199
The Cauchy Problem for Systems in Several Dimensions
Lemma 6.5.1. Suppose that IL is a smooth solution dejined for 0 5 t < T . Then there are constant K1, K2 with
lIu(.,t>ll I KI,
(6.5.3)
0 I t < T,
(6.5.4)
Proof. Integration by parts gives us I d 2 2 dt Integrating w.r.t. t, we find that
- -lJu(., t)Jl = ( u ,ut) = t(u, Au) = -cJ:(t).
JO
and the lemma is proved. Now consider a parabolic system (6.5.5)
~t = A(u)uz
+ B(u)uy + EAU,
t
> 0,
where A , B E C" are not necessarily symmetric. We assume that the coefficients grow at most linearly for large arguments: (6.5.6)
IA(u)I
+ IB(u)II K3(1 + lul),
u E R".
The following lemma contains the key result of our global existence theorem.
Lemma 6.5.2. Suppose that u, is a smooth solution of (6.5.5), (6.5.2) defined for 0 5 t < T . Ifwe assume the bounds (6.5.3), (6.5.4), (6.5.6), then
are finite.
200
Initial-Boundary Value Problems and the Navier-Stokes Equations
One shows easily that
and with assumption (6.5.4) we conclude that 1
I Jl(O)exp{ 5C3(T + K d } . Thus we have proved a bound for J l ( t ) .
201
The Cauchy Problem for Systems in Several Dimensions
If we use (6.5.7) again and observe that J;
I l)LIt~11~, then
lT
J i ( r ) d r < 00
follows. The special Sobolev inequality implies that lemma is proved.
so lul& d r < T
00,and
the
Let us assume that also the first derivatives of the coefficients in (6.5.5) grow at most linearly for large arguments:
(6.5.8)
lAu(u)l + l&(u)l
I K4(1 + lu0,
u E R".
Then we can apply the same technique to the differentiated differential equation (6.5.5). As a result, one obtains
Theorem 6.5.3. Suppose that u E C" is a solution of (6.5.5), (6.5.2)defined for 0 5 t < T . We assume the bounds (6.5.3), (6.5.4) for u = u(x,t ) and the bounds (6.5.6), (6.5.8)for the coefficients of the differential equation. Then
are finite, and consequently u can be extended as a smooth solution beyond T . If a priori bounds (6.5.3), (6.5.4) (with Kj = h;(T))hold for any finite time interval, then u exists for all time.
202
Initial-Boundary Value Problems and the Navier-Stokes Equations
The inequality for ( d / d t ) J i yields
and the desired bound follows from Lemma 6.5.2. This process can be continued, and by induction we obtain bounds for all derivatives. The remaining statements can be shown by the general arguments given at the beginning of Section 5.4.
Notes on Chapter 6 Petrovskii (1938) proved the existence of solutions of the Cauchy problem for strictly hyperbolic equations. The proof was simplified by k r a y (1953), who constructed a symmetrizer. Kreiss (1963) generalized the construction to the case where the algebraic multiplicity of the eigenvalues of the symbol P(z,t , iw) does not change. In this case the symmetrizer can be chosen as a quotient of differential operators. The smoothness of the symmetrizer is a major problem when the multiplicity of the eigenvalues changes. Besides the trivial case when the system is symmetric and H 3 I - no general theorem is known. Recently Clarke Hernquist (1988) was able to construct a smooth symmetrizer for a particular class of symbols with changing multiplicity. The class of corresponding differential equations was introduced by John (1978). For the construction of the symmetrizer for parabolic systems see also Mizohata (1956) and Kreiss (1963).
7
Initial-Boundary Value Problems in One Space Dimension
In applications the interesting phenomena frequently occur near the boundary, and consequently the formulation of boundary conditions plays an important r61e. In this chapter we treat problems in one space dimension with an interval as spatial domain. After discussion of the heat equation as a specific example, more general parabolic systems will be considered in Section 7.2. The energy method in its discrete and continuous form will be employed to show well-posedness under Dirichlet and Neumann boundary conditions. For more general boundary conditions, the Laplace transform method is the appropriate tool, and we present it in detail in Sections 7.4 and 7.5. If a determinant-condition is satisfied then the problem is strongly well-posed in the generalized sense. Important concepts of well-posedness for initial-boundary value problems are discussed in Section 7.3. For hyperbolic equations the characteristics play, of course, an eminent role in determining correct boundary conditions: Values for the ingoing characteristic variables must be provided. If this is the case and if the solution is not overspecified at the boundary, then the hyperbolic problem is well-posed. Also, we will derive boundary conditions for mixed hyperbolic-parabolic systems and will apply the results to the linearized (compressible) Navier-Stokes equations.
203
204
Initial-Boundary Value Problems and the Navier-Stokes Equations
A unified view of all results which can be obtained by the energy method is
given in Section 7.8: The energy method applies if the spatial differential operators are semihounded on the space of functions obeying the (homogeneous) boundary conditions. Throughout this chapter we restrict ourselves to linear problems, but - as in the periodic case - nonlinear equations could again be treated by an iterative process. The presence of boundary conditions does not lead to essentially new difficulties. We refer to Chapter 8 for some further remarks.
7.1.
A Strip Problem for the Heat Equation
Consider the heat equation (7.1.1)
Ut
= uxx
in the strip 0 5 z 5 1 , t 2 0. As we did earlier, we prescribe an initial condition (7.1.2)
u(2,O)= f(z), 0
5z5 1
Here f is assumed to be real. In addition, we require the boundary conditions (7. I .3)
u(0,t)= u,(l,t) = 0,
t
2 0.
We want to obtain a solution u(x!t) which is smooth, including at the “corners” ( 2 ,t) = (0,0), (z, t ) = (1,O) of the strip, and need compatibility conditions to be satisfied. Before discussing this further, let us try to find a solution using a series expansion.
Solution in series form. The first step is to construct special solutions of the differential equation which satisfy the boundary conditions. These are functions in separated variables: Introducing (7.1.4)
u(z:t) = e%(z)
into (7.1.1) and (7.1.3), we find that G(x) must be a solution of the eigenvalue problem (7. I .5)
4,, = xa,
a(0) = a x ( l ) = 0.
205
Initial-Boundary Value Problems in One Space Dimension
I
I_ u,=o
x=o
u=f
X=l
X
~
~~
FIGURE 7.1 .l. Strip problem for the heat equation.
The solutions of (7.1.5) are given by
( + -2
C j ( z ) = a, sin j
TX.
and therefore the special solutions (7.1.4) read
Any finite sum of these functions clearly satisfies the differential equation and boundary conditions. If the given initial function f(z)can be expanded in a series
which converges sufficiently fast, then
(7.1.6) is a classical solution of the initial-boundary value problem (7.1.1)-(7.1.3).
Uniqueness. For simplicity we consider only real-valued functions and define the Lz-scalar product and norm by
206
Initial-Boundary Value Problems and the Navier-Stokes Equations
The rule of integration by parts reads (.q,h r ) = -(.9r, h)
+ &I;,
.9h(:,= g ( l ) h ( l ) - .9(O)h(O).
Suppose u and v are two solutions of the initial-boundary value problem (7. I . 1)(7.1.3). We obtain, for w = u - ZI, d -(w. dt
Ul)
= 2(w,w,) = 2(w, wxx)
+
= -2(1Wz(l2 = -211wzll
i.e., llw(., t)1I2 5 Ilw(., 0)1l2 = 0. Thus w
2
1
2U,W&
50,
= 0, and the solution is unique.
Compatibility conditions, generalized solutions, smoothing. Suppose the strip problem (7.1.1)-(7.1.3) has a solution u ( x ,t ) which is C”-smooth in 0 5 x 5 1. t 2 0, i.e., up to the boundary and the initial line. This implies that f E C”, and the initial data are compatible with the boundary conditions:
f(0)= u(0,O)= 0.
fz( 1)
= u,( 1 0 ) = 0.
Differentiating the boundary conditions with respect to t and using that
we find that
3” 0 = -u(O,O)
at”
32”
d2”
dX2V
dz2”
= - u(0,O)= - f(O),
This yields necessary conditions for f if we want a solution which is C"smooth in 0 5 2 5 1, t 2 0. The easiest way to comply with these conditions is to assume that f E C" is identically zero in a neighborhood of z = 0 and
{
CT(0, 1) = f E C”(0, 1) there is
t
= t(f) > 0
One can show: If f E C,”(O, I), then the formula (7.1.6) defines a solution ~ ( tr) ,of the strip problem, which is Cm-smooth in 0 5 2 5 I , t _> 0. An estimate as in the uniqueness argument given above shows that
207
Initial-Boundary Value Problems in One Space Dimension
Since the set CF(0. I ) is dense in L2. we obtain a generalized solution for all initial functions f E L2 by the usual extension of the solution operator. One can show that the generalized solution is C"-smooth for 0 5 z 5 1, t > 0. Indeed, the formula (7.1.6) remains valid for f E Lz. t > 0. For all f E L2 the solution u ( z ,t ) depends even analytically on the argument (2. t ) for t > 0. This follows from the exponential decay of the coefficients in (7.1.6).
A priori estimates of derivatives. We want to give another existence proof using a difference approximation. First let us derive the a priori estimates for the solution. Suppose that U ( T , t ) solves the strip problem and is C=-smooth in 0 I .r 5 1, t 2 0. We have seen that d -21)~,.1)~ I 0, and thus IIu(., t)ll I Ilfll. dt Differentiation of (7.1.1) and (7.1.3) with respect to t gives us for 71 = u t : -(u, u ) =
Vt
0<.r5I1, t 2 o .
= UTT.
v(z,O) = f,,(x).
O I T l l .
u(0, t ) = v,( 1, t ) = 0.
t 2 0.
Therefore,
ll~,A..t)ll
= llur(..t)ll
I Ilf.r,.Il,
t
2 0.
Repeating this process, we find estimates for all time derivatives and the space derivatives of even order. Sobolev inequalities imply bounds for the remaining space derivatives, and estimates for mixed derivatives follow from the differential equation.
The difference scheme. We shall now approximate the strip problem by an ordinary initial value problem. Let N be a natural number, let h = 1/N denote the gridsize, and let 2, = vh. v = 0.. .. . N , denote the gridpoints. The gridfunction ~ ( twith ) components
q / ( t )= V ; ( t ) .
t 2 0.
v = 0 , ... .N .
will approximate u(z,, t). We replace (7.1. l), (7.1.2) by
d
(7.1.7)
-v,(t) dt V,(O)
= D- D+v,(t), = f(zf/),
v = 1 , . . . . N - 1; v = 1, ..., N - 1.
208
Initial-Boundary Value Problems and the Navier-Stokes Equations
The boundary conditions (7.1.3) are replaced by
vo(t) = 0,
(7.1.8)
D+v&l(t) = 0.
The equations (7.1.8) can be used to eliminate vo and U N from (7.1.7), and one obtains an ordinary (linear) initial value problem for V I,. . . ,uhr- 1 . Thus there is a unique solution v(t) = vh(t) of the above difference approximation.
Estimates for d ( t )and the limit h 0. We shall estimate all differencedifferential quotients of v = d independently of h. To this end, let us introduce some notation. If v , w are (real) gridfunctions, their discrete L2-scalar product and norm* are defined by ---$
N-l
(7.1.9) v=
I
In analogy to integration by parts we have
Lemma 7.1.1.
For all gridfunctions u , w it holds that ( V ,D-W)h
= -(D+v,
w)h
+ 2 J ~ Z l l N - i-
'L'IWO.
Proof. The formula follows from (V,D-WI)h
+
c
N-l (D+V,W)/,=
[V,(W,
- wv-1)
+ W,A%+I
-7 4
v= 1
v= I
In the next lemma, we let v ( t ) = v h ( t )denote the solution of the difference approximation defined above.
Lemma 7.1.2. Assume that f E C r ( 0 , l ) and define f(r) = Ofor T $ (0. 1). For every q = 0 , l , 2. . . ., there is an ho > 0 such that
(Here f" denotes the initial function restricted to the proper grid.) *Since the expressions (7.1.9) ignore the boundary data vg, V N . etc., we obtain a scalar product and norm on the space of gridfunctions defined on the interior grid 1 1 , . . . ,ZN- 1 .
209
Initial-Boundary Value Problems in One Space Dimension
Proof. Using the discrete boundary conditions and Lemma 7.1.1, we find that
- h(D+uo125 0:
= -1p+4#t
and therefore,
ll~J(t)ll;I l l 4 O ) I l ~= llf”ll;,. This proves the statement for q = 0. Now let (7.1.7) and (7.1.8) with respect to t yields d w,(t) = D-D+w,(t), dt
-
UI =
d v / d t . Differentiation of
v = 1 , . . . , N - 1;
uio(t) = D+wN-l(t) = 0.
The initial condition for Ub(0)
reads
UI
d dt
= -u,(O)
= D-D,
U,(O).
v = 1,.
... N
- 1.
v = 1,. .. , N - 1. Furthermore, using the boundary condiHere v,(O) = f:. tions to determine uo, ~ J Nwe , obtain that uo(O) = 0,
v N ( o ) = v N - ~ ( o ) = f‘k-1 =
o = fa!+
if h is small enough. This shows that
~ ~ (=0f,”, ) v = 0.... . N .
h 5 ho.
and therefore,
v = 1 .... , N - 1.
W,(O) = D-D+fl’,
h
I 180.
Thus we obtain, as before,
1‘
5 I I ~ + ~ - f ” t l h .h 5 ho.
IIw(f)II/, = -(t) /lh
This process can be continued and the lemma follows. approach 11d2‘jf/dx2‘Jllas h -+ 0, and The discrete norms (J(D+D-)Qf”IJh thus they are bounded independently of h. Therefore we have estimates for all time derivatives of d ( f ) which are independent of h. Interpolation leads to a solution of the strip problem for h + 0:
210
Initial-Boundary Value Problems and the Navier-Stokes Equations
Theorem 7.1.3. Assume that f E C,"(O, 1). Then the initial-boundary value problem (7.1.1)-(7.1.3) has a unique solution u E C X ( 05
3:
5
1, t 2 0).
Proof. Note that
implies that
d2u,
( t ) = (D_D+)%,(t), v dt2
= 2 , . . . ,N
-
2.
In general, dqu,
(D-D+)9uu(t)= - ( t ) , v = q ,... , N - q. dtq
If we introduce the notation
then
Thus we have bounded the divided differences with respect to z. By the results of Appendix 2 we can interpolate the gridfunctions u : ( t ) with respect to z and obtain C"-functions wh(.z,t) which are uniformly (with respect to h) smooth. In the same way as in the periodic case, we can send h -+ 0 and apply the Arzela-Ascoli theorem to obtain a C"-solution u of the strip problem.
Smoothness of the generalized solution for t > 0 . Let f E L2, and consider a sequence f k E Co3cj(O, I ) with
By definition, the corresponding solutions uk converge to the generalized solution u belonging to the initial function f. For t > 0, we can derive estimates of the derivatives of u k which depend only on Ilfkll but not on derivatives of f k . As before, this implies smoothness of the limit u for t > 0. To show the estimates, we first recall that
211
Initial-Boundary Value Problems in One Space Dimension
i.e., (7.1.10) Also,
k
= 2t(u,,,, =
4 )+ 114112
114112- 2tllui,Il2.
(Note that u:,(O,t) = @(O, t ) = 0.) Using (7.1.10), integration from 0 to t gives us that
Jo This process can be continued, and we can bound L
in terms of llfkl12. Then we can argue as in Section 3.2.6 and obtain
Theorem 7.1.4. Let f E L2, and let u denote the generalized solution to the strip problem. The function u is a Cm-smooth in 0 5 x 5 1. t > 0; i.e., u is smooth up to the boundary for t > 0.
7.2. Strip Problems for Strongly Parabolic Systems In this section we consider parabolic systems (7.2.1)
Ut
in the strip 0 5
(7.2.2)
+ B ( z ,t ) ~+, C ( X t)u . =: P ( T ,t. d / d z ) u
= A(2,t ) ~ , , 2
5 1, t _> 0. At time t = 0 we give initial data u(x,O)= f ( x ) , 0 5
2
5
1.
As boundary conditions we require n linearly independent relations between the components of u and u, at each boundary point x = 0 , x = 1; i.e., the boundary conditions have the form (7.2.3)
LjOUCj, t )
+ LjlU,(j, t ) = 0 ,
j = 0, 1,
212
Initial-Boundary Value Problems and the Navier-Stokes Equations
with constant n x n matrices Lj,, Ljl. The n x 2n matrix (L,o, Ljl) has rank n for j = 0 and j = 1 since the boundary conditions are linearly independent. The matrix coefficients A , B, C in (7.2.1) are assumed to be Cm-smooth. Furthermore, we require that
(7.2.4)
A ( z , t )= A*(Ic,t) 2 6 1 in 0 5 3: 5 I ,
0 5 t 5 T,
for some 6 > 0; i.e., the system (7.2.1) is symmetric parabolic. For the initial function f we assume that
f
E C,-(O, 1).
All functions and matrices are taken as real, for simplicity. The constants C I , c2, etc. introduced below will depend on the time interval 0 5 t 5 T, where T is arbitrary but fixed.
Extensions. The reader can generalize all arguments from the real to the complex case and assume, instead of (7.2.4),
A ( z ,t )
+ A*(3:,t ) 2 261 in
05
IC
5 1 , 0 5 t 5 T.
This generalization (to a strongly parabolic system) essentially requires one to Au,,) in the arguments given below. We replace 2(u, AIL,,) by (AIL,,,u) (u, refer to Section 3.1. Also, without difficulty, one can add a smooth forcing F = F ( z ,t ) in (7.2.1). Furthermore, the coefficients in the boundary conditions could depend on t. This would make the proofs technically slightly more complicated, however.
+
Solutions in series form. Boundary conditions of the general form (7.2.3) can be motivated as follows: If the coefficients A, B, C do not depend on time, then we can try to solve the strip problem by the same technique as in the last section and first construct special solutions in separated variables. The ansatz u(z. t ) = e%(z)
leads to the eigenvalue problem (7.2.5)
A&,
+ BC, + CC = Ail,
LjOW)
+ LjlC,(j)
= 0,
j =0,l.
For the ordinary differential equation (7.2.5), the above boundary conditions are well established. In fact, under quite general additional assumptions, one can show that the eigenvalues form a sequence Ak with Re& 4 -co, and that an arbitrary f E L2 can be expanded in terms of the functions which span the
213
Initial-Boundary Value Problems in One Space Dimension
invariant eigenspaces. If this is the case, the strip problem can be solved as in the last section in series form. 7.2.1.
Solution-Estimates under Various Boundary Conditions
The basic energy estimate. If the coefficients A , B. C are time dependent, the above approach of series expansion does not easily apply. When can we expect a unique solution of the strip problem (7.2.1)-(7.2.3)? In order to derive sufficient requirements on the boundary conditions, let us suppose that u is a C”-solution and let us try to derive the basic energy estimate. Recall the rule of integration by parts:
In order to obtain the basic energy estimate, we arrive at the following condition, which we call the
Requirement f o r an energy estimate. For all functions which satisfy the boundary conditions (7.2.6)
L,,Uf(j)
+ L,]
ui
= w ( x ) . ui E C“,
j = 0. 1,
UJAl)
= 0,
I (D,.~(*
+ cllu~11*.
the estimate (7.2.7)
(w,
I 6 A ( . , t ) ~ l , ) 5( , 5
holds.* Here c may be dependent on T but not on
0 5 t 5 T.
UI.
*The value 6 / 2 of the coefficient of IIzu,IJ* can be changed to any other positive value without altering the requirement. This will follow from the considerations below.
214
Initial-Boundary Value Problems and the Navier-Stokes Equations
Before we discuss this requirement further, we shall treat the important special cases of Dirichlet and Neumann boundary conditions. The above requirement, which leads to the basic energy estimate, does in fact imply the existence of a unique smooth solution u of the strip problem. We shall prove this below using a difference approximation.
Dirichlet conditions. Dirichlet conditions
The simplest boundary conditions are the so-called u(0,t ) = u(1, t ) = 0.
If they are imposed, then the boundary term in (7.2.7) is zero.
Neumann conditions.
These are of the form
and we can use the Sobolev inequality (see Appendix 3)
Mixed conditions. Clearly, we can also require a Dirichlet condition at one boundary point and a Neumann condition on the other. If A(O,t), say, is diagonal, we can use a Dirichlet condition for some components of 4 0 , t) and a Neumann condition for the others. If A(0,t) is not diagonal but has a complete set of eigenvectors, then we can introduce new dependent variables ii so that the matrix A(O?t) becomes diagonal. For ii we can impose boundary conditions of the form described. The general case. To discuss the general case of boundary conditions (7.2.3), first note that the requirement imposed by such a condition remains the same if we multiply the conditions with a nonsingular matrix on the left. For example, if L j l is nonsingular, we can assume a Neumann condition at z = j ; and if Lj I = 0, we can assume a Dirichlet condition at z = j . If rank Lj I = rj , 1 5 rj 5 n - 1 , we can assume that
~ j of’ size ~ rj
x n,
215
Initial-Boundary Value Problems in One Space Dimension
Partitioning Ljo correspondingly, we "split" the boundary conditions into a Neumann and a Dirichlet part:
t ) + LjoU(j,t ) = 0,
L$L,Cj,
Lj07LCj, II t ) = 0,
j = 0,l.
The following result from linear algebra will be applied at each boundary point. be arbitrary and let Lo, L I E R"*" be of the Let A E R7L*72
Lemma 7.2.1. form
LI =
(2). ($)
I T
Lo=
} n-r
where rank L: = T , rank (Lo,L I )= n. Thefollowing conditions are equivalent: (i) There exists a constant c > 0 such that
(7.2.8)
I(w, Awxjl
L clwI2
for all w,w, E R" which satisfy
LI w, + Low = 0.
(7.2.9)
(ii) & a , b E R" are vectors with
L:b = 0, L,"a = 0,
(7.2.10) then
(7.2.11) Proof. (i)
( a ,Ab) = 0.
+ (ii):
Let a, b satisfy (7.2.10), and choose 8,E R" with
L,6,,
+ Loa = 0.
Considering the vectors
w, = G , + P b ,
/ 3 R,~
w =a,
we find that ( w ,Aw,) = ( a ,A6,)
+ /3(a,Ab).
Since (7.2.9) is fulfilled for any P, there exists - by assumption - a bound of the right-hand side which is independent of 8. This implies (a, Ab) = 0. (ii)
IJ
+ (i):
Let
20,
w, satisfy (7.2.9) and decompose*
*ker L = {s 1 Ls = 0 ) is the kernel or nullspace of L. By E S } we denote the orthogonal complement of a subspace S.
SL =
1
{ s ( s , ~ )=
0 for all
216
Initial-Boundary Value Problems and the Navier-Stokes Equations
Clearly, L,"w = 0, and therefore (ii) implies that (w, Azli,) = (w, Aw;)
If s I ,. .. , s , , ~ , .denotes a basis of ker L;, then wp fulfills the matrix equation
The system-matrix is nonsingular; thus one can solve for w;, and the estimate (7.2.8) follows. Remark. Condition (ii) states geometrically that the kernel (= nullspace) of L," is orthogonal to the A-image of the kernel of L;. Since ker LA' has dimension T and ker Lf has dimension n - T , and since A is nonsingular in our application, we obtain that the equality (7.2.12)
ker I,;' = { A(ker L;)}'
is an equivalent formulation of (ii). Formally, condition (ii) is also applicable for Dirichlet and Neumann conditions characterized by kerL: = R7', kerLL' = (0) and ker L! = {0}, ker Li' = R", respectively. If the boundary conditions are neither of Dirichlet nor of Neurnann type, then (7.2.12) puts a severe restriction on A. We apply the previous lemma to show
Lemma 7.2.2. (7.2.13)
There is an energy estimate (see (7.2.7)) ifand only
L'3 1 bJ. = 0,
L30 I 'a .J = 0, j = 0 , l .
aj,
if
bj E R",
implies that
(7.2.14)
( a j , A(j,t)bj)= O ,
j =0, 1, 0 5 t
5 T.
Proof. First assume that (7.2.14) holds for all vectors with (7.2.13). By the previous lemma,
217
Initial-Boundary Value Problems in One Space Dimension 2
( ( ~ ( j )A,( j , t ) w A j ) ) /I c ( j , t ) / W ) l . The proof of Lemma 7.2.1 shows that c(j. t ) can be bounded uniformly for 0I tI T . An application of Sobolev's inequality 2
lulls
5 ~llW,Il2
+
C(~)llw1l2.
f
> 0;
shows (7.2.7). Conversely, suppose that (7.2.7) holds for all functions w with (7.2.6). Since - for each fixed t - the vectors ~ ( jt ),, ui3;(.j,t ) , j = 0, 1, can be prescribed arbitrarily, it is necessary that an estimate
1 ( ~ 4 t>, j , A ( j , t>w,(j, t ) )I I cci, t > ) w ( jt))' , 2
holds. (The right-hand side of (7.2.7) cannot be used to bound a term )w,(j, t)l .) Another application of Lemma 7.2.1 finishes the proof. For later purposes we show
Lemma 7.2.3. Suppose the matrix function A satisfies (7.2.4) and suppose the requirement for an energy estimate to be valid. Then the 11 x n matrices
are nonsingular.
Proof. Otherwise there exists a vector aj # 0 with ~ j , a =j 0. Ljoaj I1 = 0. Condition (7.2.14) implies that ( a j , ACj, t ) a j ) = 0,
in contradiction to (7.2.4). A pnori estimates of the solution and its derivatives. Suppose that the boundary conditions are such that (7.2.7) holds; i.e., there is an energy estimate. Furthermore, assume that u is a C"-solution of the strip problem. Clearly,
218
Initial-Boundary Value Problems and the Navier-Stokes Equations
We want to show that we can also estimate the derivatives of u; we set v = ut. Differentiation of (7.2.1), (7.2.3) yields
+ Bv, + CV + P ~ u , P ~ u= A~u,, + B ~ u +, C ~ U , LjOVO’, t ) + LjlV,O’, t ) = 0, j = 0, 1. ~t
= Av,,
Thus, except for the inhomogeneous term Ptu, the time derivative v = ut satisfies the same differential equation and boundary conditions as u. By (7.2.1), IIu,,II
= IIA-’v - A-IBu, - A-’CuII
5 C l { l l V l l + Iluzll + 1141). Using the Sobolev inequality
lluzll I ~ I l ~ ~+ZCI( 4l I I 4 I , we obtain that (7.2.15)
IIuzzII
+ Il%ll I cz{ ll4l + 1141}!
i.e., IlPtull I c3{ 1 141+ Ilull}. As before, d -ll.U1l2
dt
I2(v,Av,,)
+ c4{ 11?J11 11%11 + 1 1 ~ 1 1 2 + 1 .1 2}
I ~ 5 ( 1 1 ~ 1 1 ’+ Il~lI’>. Since we have already a bound for IIuII, we obtain an estimate for v = ut. By (7.2.15) the space derivatives u,, u,, are also bounded. Repeated differentiation with respect to t gives us the desired estimates. We summarize the result in
Lemma 7.2.4. Suppose that the boundary conditions are such that the requirement for an energy estimate is fulfilled. Given any nonnegative integers p , q and any time T > 0, there exists a constant K = K ( p ,q , T ) such that
in 0 5 t 5 T . The constant h’ is independent off E C,oO(O,1).
219
Initial-Boundary Value Problems in One Space Dimension
7.2.2. Existence of a Solution via Difference Approximations The difference scheme. The notations for the gridsize h = 1/N, the gridpoints . . , X N , etc., are the same as in the last section. We replace the strip problem (7.2.1t(7.2.3) by 20,.
(7.2.16)
dv,(t)/dt = A,D-D+v,(t) =: Q(x,,t)vu(t), vu(0) = fb,).
(7.2.17)
+ BuDov,(t) + C,v(t) v = 1 , . . . , N - 1. 1 , ..., N - 1 .
Y =
Loovo(t)+ Lo1 D+vo(t) = 0, LIOUN(t)
+ LIID+V,v-l(t) = 0,
t>o
The discretized boundary conditions can also be written in the form
(7.2.18)
+
( L I I ~ L I o ) , u N= ( ~L) I I V , V - I ( ~ ) . We assume the requirement for an energy estimate to be valid. Then it follows from Lemma 7.2.3 that the above equations can be solved for vo(t), V N ( ~ if) h is sufficiently small. Thus we can eliminate vo and ZIN from (7.2.16). Therefore the difference scheme has a unique solution v ( t ) = oh(t) for 0 < h 5 ho.
The basic estimate. In the following we estimate the solution v h ( t ) of the difference scheme independently of h; we start with
Lemma 7.2.5.
There is a constant K and a step-size ho > 0 with Ilvh(t)l12h
.for 0
I Kllfh112h7 0 5 t 5 T ,
< h 5 ho.
Proof. a) We remind the reader of the notations
u=
I
u
=o
220
Initial-Boundary Value Problems and the Navier-Stokes Equations
Since the pair vo(t),D+vo(t)satisfies the boundary conditions at obtain, from (7.2.8),
Therefore we have the estimate
2
= 0, we
221
Initial-Boundary Value Problems in One Space Dimension
This proves the basic estimate for all sufficiently small h.
Estimates of derivatives, existence, smoothing.
In a similar way as in the last section, by considering the difference equations satisfied by w = d u / d t , we also can estimate derivatives.
Lemma 7.2.6. Suppose that f E C,"(O, 1) and define f(z)= 0 for z $ (0, 1). As before, assume the requirement for an energy estimate to be valid. Given any nonnegative integer q and any T > 0, there is a constant K and a step-size ho
> 0 with dq Il-&t)llh
for 0 < h
2
I K { Il(D-D+)q f h Ilh2 + Ilfhll:L}
0I t I T,
1
I ho,
Proof. The function w = d u / d t satisfies the difference equations dw,/dt = &(z,, t)w,(t)
+ & t ( ~ , , t)u,(t),
v = 1,. . . , N - 1 ,
and the same boundary conditions as u. The initial data are
~ ~ (= 0dv,(O)/dt ) = & ( ~ , , 0 ) ~ , ( 0 ) ,v = 1 , . . . , N - 1. Here u,(O) = f(z,), v = 1,. for sufficiently small h,
.. , N
.O(O)
- 1, by (7.2.17). Using (7.2.18) one obtains,
= v ( 0 ) = 0 = f(zo),
and thus
w,(O) = & ( z , , O ) f ( z V ) ,
v = l ? .. . , N
-
1.
We can proceed in exactly the same way as for the a priori estimate of show that IID-D+4h I CI { IlWllh llD-D+Vllh
+ IID+4lh + 1 1 ~ 1 1 h ) ~
+ IID+~II/l 5 c2{ 11W11h + Il.llh}.
tiLtand
222
Initial-Boundary Value Problems and the Navier-Stokes Equations
Thus the extra term Qt(z,,t)v,(t) poses no problem, and we obtain the desired estimate for w = d v / d t . The lemma follows by repeated differentiation with respect to t. Clearly, we can use the time derivatives to estimate the divided differences Il(D-D+)qvhIlq,N-q
independently of h. Therefore, as in the last section, we can use interpolation to obtain existence of a solution for h + 0. We summarize the main result in
Theorem 7.2.7. Suppose that f E C,”(O, 1). and assume that the boundary conditions are such that (7.2.7) is valid for all functions with (7.2.6); i.e., we have the basic energy estimate. Then the strip problem (7.2.1)-(7.2.3) has a unique solution u. The solution is C”-smooth in 0 5 x 5 1, t 2 0. The solution and its derivatives can be estimated in terms o f f and its derivatives. For all initial data f E L2 there is a unique generalized solution. The smoothing properties of parabolic equations remain valid for the initial-boundary value problem. The proof proceeds in the same way as in the last section by showing an estimate of tP
in terms of 11 f [I2.
(1 d*u/dzP 112
The generalized solution is a C”-function in 0 5 z 5 1,
t > 0.
7.3. Discussion of Concepts of Well-Posedness In this section we give a somewhat informal discussion of different concepts of well-posedness for initial-boundary value problems. We do not restrict ourselves to the case of one space dimension and consider a system of differential equations (7.3.1)
ut = Pu
+ F ( 2 ,t ) ,
zE
t 2 0,
R,
with initial data 4 x 1 0 ) = f (z),
(7.3.2)
2
E 0,
and boundary conditions (7.3.3)
Lu = g(z, t ) ,
2
E
dR,
t 2 0.
Initial-Boundary Value Problems in One Space Dimension
223
Here P is a linear spatial differential operator whose coefficients may depend smoothly on z and t, and L is a linear operator combining values of u and its derivatives at the boundary. In general, L may also involve time derivatives of u. The boundary
r = an of the domain R c R“ is assumed to be smooth. We consider F. f, and g as the data of the problem, the operators P and L and the domain R being fixed. Roughly speaking, the initial-boundary value problem (7.3.1)-(7.3.3) is called well-posed if for all smooth compatible data F, f, and g there is a unique smooth solution u, and in every finite time interval 0 5 t 5 T the solution can be estimated in terms of the data. Clearly, to arrive at a definition, we must specify the norms which enter the estimates.* In the following we shall use the notation
For example, in case of the strip problem in one space dimension we have
The Cauchy problem. Let us recall the definition of well-posedness for the spatially periodic Cauchy problem or the pure Cauchy problem. In those cases well-posedness required an estimate of the form (7.3.4) for 0 5 t 5 T. Using Duhamel’s principle, one can replace such an estimate by estimates for the case F 0. We have used this for constant-coefficient operators P in Chapter 2. Also, one could develop a theory of well-posed problems where the estimate (7.3.4) is weakened in the following way: First, without much restriction, one can assume that f(z)= 0 because the transformation
=
*It is not essential to make the smoothness assumptions for F, f , g, and u more precise. The reader can always replace “smooth” by C”. Once estimates are derived for this case, more general - less smooth - data can be treated by approximation as long as the norms for the data are defined. One obtains a generalized solution.
224
Initial-Boundary Value Problems and the Navier-Stokes Equations
leads to zero initial data. Then, instead of (7.3.4),one could require an estimate
(7.3.5) Such a concept of well-posedness would be satisfactory in the sense that “no derivatives are lost”. If F E Corn,then all derivaties of u vanish on the initial line t = 0, and - by differentiating the differential equation (7.3.1)- one obtains equations like (7.3.1) for the derivatives of u. Only the lower order terms will have changed. Thus, as we have seen, in many cases one can derive estimates like (7.3.5) for the derivatives of u in terms of the derivatives of F . Clearly, (7.3.5)is - at least formally - a weaker requirement than (7.3.4). However, for the pure Cauchy problem or the periodic Cauchy problem not much seems to be gained by such a generalization of well-posedness. We do not know of any problem for which (7.3.5)holds but (7.3.4)is not valid. (If the coefficients of P are allowed to become singular for t = 0 it seems likely that (7.3.5) can indeed become a truly weaker requirement.)
Strongly well-posed problems. Consider now the initial-boundary value problem (7.3.1)-(7.3.3). Generalizing (7.3.4)we give The initial-boundary value problem (7.3.I)-(7.3.3)is called Definition 1. strongly well-posed if for all smooth compatible data F, f,g, there is a unique smooth solution u, and for every finite time interval 0 5 t 5 T there is a constant KT such that
in 0 5 t 5 T . The constant KT may not depend on F, f, or 9. The above estimate holds for parabolic equations with Neumann boundary conditions in any number of space dimensions (see Section 8.1)and for hyperbolic equations in one space dimension. One can give examples to show that there are real difficulties in estimating the boundary term
Initial-Boundary Value Problems in One Space Dimension
225
in more than one space dimension for hyperbolic problems. The failure to estimate this term is not due to the techniques employed.
Homogeneous boundary conditions. We can always transform to homogeneous boundary conditions by constructing a function = +(x?t ) with
+
L$ = g. Then u = u - $ satisfies the homogeneous condition
Lv
= 0.
This motivates
Definition 2. Consider the initial-boundary value problem (7.3.1)-(7.3.3) with g = 0. We call the problem well-posed if for all smooth compatible data F and f there is a unique smooth solution u,and we have, instead of (7.3.6), (7.3.7)
in 0 5 t 5 T . There are technical difficulties in working with this concept of well-posedness. To illustrate these, assume we have obtained the basic estimate (7.3.7), for example by integration by parts. We would like to show similar estimates of the derivatives of the solution in terms of the derivatives of the data. To this end, we differentiate the given equations (7.3.1) and the boundary conditions (7.3.3) with respect to t and in the tangential directions to obtain equations of a similar type for the derivatives. In this process, however, inhomogeneous boundary terms will appear, in general, if the boundary operator L has variable coefficients. These can be subtracted out by other functions $, as before. However, derivatives of $ appear as inhomogeneous terms in the differential equation, and in the resulting estimate we “loose” derivatives; i.e., we need higher derivatives of the data to bound lower derivatives of the solution. This is intolerable if one wants to go over to nonlinear problems, for example. To summarize, the above concept of well-posedness (with g = 0) leads to technical difficulties if the differentiation of the boundary conditions introduces inhomogeneous terms.
An example. To illustrate the foregoing, consider the following simple example
u t = u 2 , + F ( x , t ) in 0 5 x 5 I , U(Z,O)
= f(x>. 0
u(0,t ) = go(t),
t20,
5 I 5 1,
Wr(1,
t ) = g1(t).
t 2 0.
226
Initial-Boundary Value Problems and the Navier-Stokes Equations
The data are assumed to be compatible. We try to derive the basic estimate and proceed as in Section 7.1:
= -(uz,uz)
+ ( u ,us)l oI +
F).
(U?
The boundary term is (21,
%)lo
I
= 4 1 , t)uz(l, t>- 4 0 , ~ ) % ( O ,
t>
= 4 1 , t)gl(t) - go(t)uz(O, t).
Using Sobolev inequalities, the term u( 1 1 t)gl ( t )
originating from an inhomogeneous Neumann condition can be estimated properly:
go(t)uz(O, t )
originating from an inhomogeneous Dirichlet condition cannot be treated. We can only derive energy estimates if we first transform to homogeneous Dirichlet conditions. To this end, choose a function 4 E CM with
Then
satisfies homogeneous Dirichlet conditions at z = 0. Therefore IJ can be estimated in terms of the data. (The first derivative of go is needed but this is not important.) We can proceed as in Section 7.2 to estimate derivatives of IJ. No problems occur here since the coefficient which defines the homogeneous condition. v(0, t ) = 0,
227
Initial-Boundary Value Problems in One Space Dimension
is constant. Thus the relation remains homogeneous if we differentiate it to derive a condition for u t .
Another example. Consider a parabolic strip problem
Neumann boundary conditions. If L j l ( t ) , j = 0, 1 , are nonsingular for all t 2 0, there are no difficulties in deriving an estimate of the form (7.3.6). We refer to Section 8.1.2 where we treat this situation in more than one space dimension. The above strip problem is strongly well-posed if the boundary conditions allow us to express u,(j, t) in terms of u ( j ,t), g j ( t ) . Dirichlet conditions. Another extreme case is L j l ( t ) boundary conditions read
= 0,j
= 0, 1.
The
uci, t ) = ~ j O ( t ) - l .gj(t).
After transforming to homogeneous conditions as indicated above, we obtain the basic estimate and estimates of derivatives.
Mixed conditions. If the boundary conditions contain a Dirichlet and a Neumann part, we must transform the Dirichlet part to become homogeneous with a constant coefficient matrix. Then, if we can derive the basic estimate, we can also estimate derivatives. Strongly well-posed problems in the generalized sense. Instead of transforming to homogeneous boundary conditions, it is also of interest to study the case f = 0. (This will become more apparent below, when we will use the Laplace transform in time; defining u(z,t)= 0 for t < 0, we obtain a continuous function u only if u(z,O) = f(z)= 0 .) Definition 3. Consider the problem (7.3.1)-(7.3.3) with f s 0. We call the problem strongly well-posed in the generalized sense if for all smooth compatible data F and g there is a unique smooth solution u and we have, instead of (7.3.6),
228
Initial-Boundary Value Problems and the Navier-Stokes Equations
in 0 I t I T . The theory of strongly well-posed problems in the generalized sense is well developed for parabolic and hyperbolic systems. In case of constant coefficients, there are necessary and sufficient conditions of an algebraic nature. For variablecoefficient problems the estimates are valid if all relevant frozen-coefficient equations are strongly well-posed in the generalized sense. As we shall show, initial-boundary value problems for strictly hyperbolic and symmetric hyperbolic systems which are strongly well-posed in the generalized sense are also strongly well-posed in the sense of Definition 1. For parabolic systems such a result does not hold. As mentioned before, the assumption f = 0 does not pose technical problems if one wants to estimate derivatives. We need only to assume that F vanishes identically in a neighborhood of t = 0 then all derivatives of u are zero at t = 0. The set of all smooth F vanishing identically near t = 0 is still dense in L2.
Weakly well-posed problems. Finally one can weaken the required estimate further by assuming that both the initial function f and the boundary data g vanish. We give Definition 4. The problem (7.3.1)-(7.3.3) with f = 0, g = 0 is called weakly well-posed if for all F E C r there is a unique smooth solution u and, instead of (7.3.6), we have
in 0 5 t 5 T . At present, there is no general theory available for weakly well-posed problems. We anticipate that any such theory would be extemely complicated.
7.4. Half-Space Problems and the Laplace Transform One aim of this section is to indicate the limitations of the energy method in a discussion of well-posedness. We shall employ the Laplace transform in time to solve parabolic initial-boundary value problems and shall show that these problems are strongly well-posed in the generalized sense if and only if a
229
Initial-Boundary Value Problems in One Space Dimension
certain determinant condition is fulfilled. Using this technique, one can decide the question of well-posedness in the generalized sense. In contrast to this, if the boundary conditions are neither of Dirichlet nor of Neumann type, the energy method applies only in exceptional cases.
Parabolic Half-Space Problems*; Main Result
7.4.1.
Consider an equation
(7.4.1)
Ut
+ F ( x ,t),
= Au,,
in the domain 0 5 x conditions at x = 0,
<
00,
A
+- A* 2 261,
5
> 0,
t 2 0, under n linearly independent boundary
and an initial condition (7.4.2)
u(z,O) = f(x),
05
2
< 00.
Assumptions. The n x n matrices A, LO,L I are assumed to be constant; results for variable coefficients are stated at the end of this section, without proof however. Throughout, the assumption of strong parabolicity A
+ A* 2 261,
5
> 0,
is essential. Concerning the boundary conditions: If rank L I = r, then we can assume, without restriction, that the matrices are of the form
where LA, L: have size r x n, and the boundary conditions take the form
(7.4.3)
L,'u(O, t )
+ LfU,(O,
t )= gqt),
L,"U(O, t ) = g"(t).
(The cases.of a Dirichlet condition, T = 0, and a Neumann condition, T = n, are formally included in our discussion. However, the reader may focus attention on the mixed case where 1 5 r 5 n - 1; only in the latter case do the Laplace transform method and the energy method differ significantly.) As previously, it is not a severe restriction to put strong smoothness assumptions on the data, namely
F
E
C,-(O < z , t < 00),
f
E
Co"(0 < x
< m),
g E Co"(0 < t
< 00).
*Since we work in one space dimension, the half-space is actually only the half-line 0 5 z < m in this section.
230
Initial-Boundary Value Problems and the Navier-Stokes Equations
Once solution-estimatesare derived under these assumptions, more general data can be treated by approximation.
Solution concept. We seek a solution
z , t < 00)
u E CoO(O5
for which all derivatives are Lz-functions of 0 5 z < 03 at each time t:
dP+Q
< 00, t 2 0.
I l ~ U ( . ? t ) l l
This requirement can be thought of as a boundary condition at z = +w.
The main result. Before giving further motivations, let us formulate the main result of this section; it will be proved below via Laplace transformation. Henceforth, we assume that the matrix A has n distinct eigenvalues pk. We transform A to diagonal form
introduce the notation (7.4.4b)
A = diag (-fi,
1
1 *.
. , -),
6
1
Re -
& ' 0i 1
and define the square matrix (7.4.4c)
Theorem 7.4.1. If det CO # 0, then the parabolic initial-boundary value problem (7.4.1)-(7.4.3) has a unique solution. For f = 0, the problem is strongly well-posed in the generalized sense. The same result is valid (with exactly the same determinant condition) for an equation with lower-order terms, ut = Au,, -I-B U ,
+ CU+ F ( x ,t ) .
7.4.2. The Energy Method Assume that the problem (7.4.1H7.4.3) has a solution u and let g" = 0. We try to obtain a solution-estimate by the energy method; thus we consider the time derivative of the energy:
231
Initial-Boundary Value Problems in One Space Dimension
we must bring the boundary conditions into play. The proof of the following result, which slightly generalizes Lemma 7.2.1, is left to the reader.
Lemma 7.4.2.
Let A, LO,L1 E C",",
Lo =
($) ,
Ll =
(2)
1
where L i , Lf have size r x n, rank L: = r , rank(L0, LI) = n. The following conditions are equivalent: (i) There exists c
> 0 such that I(w, AW5)I
5
c{
1wI2 + Jg'I2}
for all w , wx E C", g' E C' with
Low
+ L,wx =
(0.
(ii) If a, b E C" are vectors with L!b = 0, Li'a = 0, then ( a ,Ab) = 0.
232
Initial-Boundary Value Problems and the Navier-Stokes Equations
If the matrices A, LO,L , meet the requirements of the previous lemma, then
in 0 5 t I T. One can also show the existence of a smooth solution, and therefore the problem is strongly well-posed in the sense of Definition 1, Section 7.3. If the conditions of Lemma 7.4.2 are not met, then the energy method does not apply, and the question of well-posedness may be investigated by other means only.
Example. To illustrate the differences, we apply Theorem 7.4.1 and the energy method to the following simple example:
Vz(O, t )
+ wW,(O,t ) = g'(t),
t 2 0,
U(Z,O)
v(0,t )
= f(z),
0
+ cyw(0, t ) = 0, 5 2 < CQ.
Here
L,' = (O,O),
L: = (1, l),
L," = ( l , c y ) ,
The matrix Co reads
with det CO= cy
-
2; thus Theorem 7.4.1 applies whenever
cy
# 2.
*
233
Initial-Boundary Value Problems in One Space Dimension
When does the energy method apply? We check condition (ii) of Lemma 7.4.2 and find
-:.
Thus the energy method applies only for Q. = This example is typical for parabolic problems under mixed boundary conditions: The energy method applies only in exceptional cases whereas the Laplace transform method applies in most cases, and yields well-posedness in the generalized sense. What can be said if det Co = 0, ie., if Theorem 7.4.1 does not apply? We will show in Section 7.5 that the problem indeed becomes ill-posed in the generalized sense; again, this result remains valid if lower-order terms Bux C u are added to the differential equation.
+
7.4.3. An Eigenvalue Problem Suppose that F = 0, g
= 0 in (7.4.1)-(7.4.3)
u(x,t)= e S t f ( x ) ,
s E
and substitute
C,
f E C”,
into the equations. One obtains a solution* if and only if OIx<0O,
(7.4.5)
f
E L2.
t) are in L2 if f E L2; this follows from (Note that all derivatives of u(., sf = Af,,.) Considering s E C as a parameter, we have obtained an eigenvalue problem and give
Definition I. A number s E C is called an eigenvalue of (7.4.5) if - for the number s in question - there is a non-trivial solution f = f(x), f E C” n L2. Using elementary means of linear algebra, we shall discuss the constantcoefficient problem (7.4.5) below. First let us indicate the relevance of eigenvalues for the question of well- or ill-posedness.
Lemma 7.4.3. lfthere is a sequence s, of eigenvalues &th Re s, the problem (7.4.1)-(7.4.3) is ill-posed in any sense.
+ 00,
then
Proof. If such a sequence s, exists, then there is no bound on the exponential growth rate (in time) of genuine solutions. *Recall that the requirement u ( . ,t ) E L2 is part of our solution-concept; consequently we exclude all solutions f of sf = A J Z Zwhich grow exponentially as z + 00.
234
Initial-Boundary Value Problems and the Navier-Stokes Equations
Now we solve the eigenvalue problem (7.4.5) explicitly; the reader is reminded of the notations (7.4.4). For any s E C, R e s > 0,the general solution of sf = Af,,,
f
E L2(0
5 z < 001,
is given by*
Clearly,
If we introduce these expressions into the (homogeneous) boundary conditions (7.4.3), we obtain a linear system for the vector (T E C". After division of the first T equations by -&, the system takes the form
(7.4.6) Thus we have shown
Lemma 7.4.4. A number s E C, Re s > 0, is an eigenvalue of (7.4.5) if and only ifthe determinant of the matrix (7.4.6) vanishes. These results motivate Theorem 7.4.1 (but they do not prove it): If Re s + 00, then the matrices (7.4.6) converge to CO;consequently, if det CO# 0, there are no eigenvalues with arbitrarily large real parts. If one had a converse of Lemma 7.4.3, then well-posedness would follow. Unfortunately, a complete proof of Theorem 7.4.1 is more elaborate. A simple conclusion can be drawn, however, from the results shown:
Lemma 7.4.5. Let detCo = 0, and assume that L,' = 0, i.e., that the Neumann part of the boundary conditions has no lower-order terms. Then the problem (7.4.1)-(7.4.3) is ill-posed. Proof. All numbers s E C, Re s Lemma 7.4.3. *For any complex number c with Re c
> 0, are eigenvalues. The result follows from > 0 let fi denote the root with Re fi > 0.
235
Initial-Boundary Value Problems in One Space Dimension
7.4.4.
The Laplace Transform; Elementary Properties
In this section we introduce the Laplace transform Q = 2(s) of a function u = u(t) and prove some elementary results, which will be needed below. Essentially all the results follow quite easily from corresponding properties of the Fourier transform. To avoid confusion, we use here the following notation for the Fourier transform of II = v(t):
Laplace transform vs. Fourier transform. Suppose u = u(t),0 5 t < 00, is a continuous function with values in C n , which satisfies an estimate (u(t)l 5 Ceat, t
2 0,
for some real constants C , a. The analytic function* ePstu(t)dt, s E C,
Res
> 0,
is the Lupfuce transform of u. The Laplace and Fourier transform are closely related; to explain the relation, we set uo(t>=
t > 0,
u(t) +(O)
t = 0, t<0,
{o and note that each function
v,(t) = e-"tuo(t),
77
> a,
has the Fourier transform
(F%JC) = -
-i
e- Vtuo(t)dt,
< E R.
Therefore we have the relation ii(7
+ it) = &(.Fv,)(<),
The Fourier inversion formula gives us
*The integral is defined componentwise.
71 > a ,
< E R.
236
Initial-Boundary Value Problems and the Navier-Stokes Equations
and thus we have shown the following inversion formula for the Laplace transform:
Applications of Parseval's relation. For a function v = v(t) and its Fourier transform Fv = (Fv)([) it holds that
1, m
s_, 00
Iv(t)l2 d t =
l(F'V)(€)l2 d€.
In terms of the Laplace transform, the formula reads
As a consequence one obtains - for each finite time T - an estimate of u in terms of its Laplace transform:
In our applications below we consider continous functions 21
= u(z,t), 0
5 z < 00, t 2 0.
Suppose that u satisfies an estimate
Iu(z,t)l 5 Ceat,
o 5 z < 00,
t 2 0;
then &(z,s ) =
1,
e-stu(z,t )d t ,
05z
< 00,
Re s
> a,
denotes the Laplace transform in time. We want to show
Lemma 7.4.6. Under the above assumptions let u(.,t ) E L2 for each t 2 0 , and assume we have a bound llu(.,t)JI2 5 K2e2"t, t 2 0. Then
237
Initial-Boundary Value Problems in One Space Dimension
and consequently,
(Under our assumptions the integrals exist and are finite.) Proof. The result follows if one integrates the relation
with respect to z and interchanges the order of integration. Integrability of the function e-2Vtlu(z, t)12,
z
2 0, t 2 0.
and Fubini's theorem justify the interchange.
Laplace transform of time derivatives. Suppose that u = u(t), 0 5 t < 00, is continuously differentiable and
Then integration by parts gives us that Ct(S)
=
lx
e-Stut(t)dt = - 4 0 )
+ sC(s)
for Re s
> a.
Future does not affect past. We will need a result which states - roughly speaking - that we may alter data g ( t ) for t > T without changing the solution for t 5 T. For illustration, we consider an ordinary initial value problem du dt
-(t) = Lu(t)+ g ( t ) , t 2 0, where L E C".", L
u(0) = 0,
+ L* 5 2PI, and 9 = g ( t ) is continuous with Ig(t)l
5 Cerrt, t 2 0.
Laplace transformation gives us s q s ) = LG(s)
+i(s).
and thus C(s) = ( s 1 - L ) - ' i ( s )
for Re s
> max{cl, p } .
238
Initial-Boundary Value Problems and the Navier-Stokes Equations
Using the inversion formula (7.4.7), we obtain an explicit expression for the solution u(t). Since ij(s) depends on all values g(t),one might be tempted to conclude from this formula that each value u(t0) depends on all values g(t), too. However, as is well-known for the above initial value problem, if we alter the data g(t) for t > T , the solution u(t)remains unchanged for 0 5 t 5 T . A slight generalization of this result is contained in
Suppose that u = u(t), g = g(t), 0 5 t < 00, are continuous functions bounded in norm by some exponential teat, and suppose that their Laplace transforms satisfy an estimate
Lemma 7.4.7.
for some constants c1, a1 2 a. t f g ( t ) = 0 for 0 5 t 5 T , then u(t) = 0 for 05tlT. Proof. We fix a time TI < T and use (7.4.9) for 71 > a1 00
1
Iu(t)I2dt 5 -e211Tl 21T
Lm
= cle211T1
e-211tlg(t)12 dt (by (7.4.8))
For 71 + 03 we obtain
Since TI < T is arbitrary and
IL
is continuous, the result follows.
Estimates of the Laplace transform. Let g E CF(0 < t < 00). Then integration by parts gives us
239
Initial-Boundary Value Problems in One Space Dimension
ij(s) =
I~(s)( 5
Lm
e-st,q(t) d t = - S
Lrn
e-s'g'(t)
dt,
K I / ~ s ~R. es > 0.
This process can be repeated. Therefore, for any p = 1, 2, . . . , there is a constant K p = K p ( g )independent of s with I$(s)(
In other words, as Is( -+ any power 1 s I - p .
5 K p / l s l p , R e s > 0.
00,R e s
> 0, the function
I$(s)[ decays faster than
7.4.5. Solution via Laplace Transform Consider the parabolic initial-boundary value problem (7.4.1k(7.4.3) under the assumptions stated in Section 7.4.1. In addition, we assume first that f G 0 and L,' = 0; thus the Neumann part of the boundary condition at z = 0 has no lower-order terms. If the matrix COintroduced in (7.4.4~)is singular then, according to Lemma 7.4.5, the problem is ill-posed, and consequentIy we assume that detCo # 0. We shall construct a solution via Laplace transformation and derive solution-estimates which imply strong well-posedness in the generalized sense.
Estimate of the Laplace transform. To begin with, assume that there is a solution u = u(z,t) which is "well-behaved" in the sense that all the following operations are permitted. The solution formula derived below can subsequently be used to justify this assumption. Laplace transformation gives us s f i ( z ; s ) = AGZT(z, t)
Lffi,(O, s ) = $ I ( &
((a(.!s)((< 00 for
+ &z,
L,"fi(O, s) = $II(S), R es
> 0.
We prove the following estimate of .ii in terms of
Lemma 7.4.8. g = g ( t ) with
s),
E
and ij:
There is a constant c independent of the data F = F ( z ,t ) and
240
Initial-Boundary Value Problems and the Navier-Stokes Equations
for all s E C , Re s > 0. (Here and in the following, the powers of Is1 have signijicancefor large IsI, not for s x 0.)
Proof. a) For brevity we set p = 4, largpl
< 5.Introducing the vector
we can write the second-order differential equation for f i ( . : s ) as a first-order system:
The boundary conditions become
The system-matrix
can be diagonalized; using the notation (7.4.4), we set I
/!PA-'
-!PA-'
@A-' @
and obtain (note that @ - ' A @= AP2)
-A
0
In the new variable = S , - ' W ( Z , s)
C(Z, s) =
the system is diagonal: (7.4.11)
Gx(x,s) = P
-A
O
6 ( x ,s) -
1 -
-F(x,s), P
241
Initial-Boundary Value Problems in One Space Dimension
The boundary condition at
2
= 0 reads
where
Thus the matrices Bo, B I have size
R x
n, and
is nonsingular since det CO# 0 by assumption. Therefore we obtain that
G‘O’(0,s) = B&j(s) - B01BI6‘1’(0,S).
(7.4.12)
b) With a number d
>
1, to be specified below, we set
D = ( ’ 0 -dI
)
The differential equation (7.4.1 1) yields for each fixed s, Re s
> 0,
+ (DGz16)= 2Re(.27,,D6,)
(6, DG,)
= -2Re ( G , p
(t
:A)
6)- 2Re (6, ;D”). 1
Since all diagonal entries Xk of A have positive real part and since larg pI there is 51 independent of p with Re(pXk.) 2 611PIl
61
< :,
> 0,
and therefore 2d ( ~ 11G11IIPII. 2 Re (G, DG,) I -261 ( P ( ( ( G ’ ( -
+ IPI
On the other hand, using integration by parts and the boundary condition (7.4.12), we find that
(6, DG,)
+ (Dtb,, G ) = (6, DG) I
x=o
242
Initial-Boundary Value Problems and the Navier-Stokes Equations
Here the constant C I depends only on the matrices Bo, Bl in (7.4.12). If we choose d _> 1 c1 and combine the two estimates, we obtain that
+
Thus there is a constant c2 independent of the data and of s E C, R e s with
In terms of the original variables Q, ij', 6'', and the lemma is proven.
p , the desired estimate
> 0,
follows,
Estimate of the solution. The previous lemma gives us an accurate bound of the Laplace transform 6 of the solution u in terms of the Laplace transforms P , $ I , GI' of the data F, g', g". We can now apply the results of Section 7.4.4 - which were themselves simple applications of Parseval's relation - to estimate u in terms of F and g', g". One obtains
Lemma 7.4.9. First assume that g" = 0. For each time T > 0 there is a constant K T , independent of the data F, g', with
If g"
is not necessarily zero then
Proof. Assume that g" G 0 and consider, for example, the integral of Ju,(O, t)I2 We fix 77 2 1 and obtain, from (7.4.9),
243
Initial-Boundary Value Problems in One Space Dimension
According to Lemma 7.4.7, the integral on the right-hand side can be bounded by
Here
by (7.4.10~).The integral of way one obtains a bound by
($I2
is estimated similarly using (7.4.8). In this
+
Now we change the data in such a way that they vanish for t 2 T f , c > 0. Reasoning as in the proof of Lemma 7.4.7, we note that the solution remains unaffected for t 5 T; since 6 > 0 is arbitrary, the result follows.
Existence of a solution. Thus far we have not shown the existence of a "well-behaved'' solution for which the above computations are justified. On the Laplace-transform side, existence can be shown quite easily. All we need is the following simple existence result for scalar equations on the interval 0 5 z < 03. Lemma 7.4.10.
Consider a scalar equation
dv dx
-(z)
= Xv(z)
+ q(2),
< where ReX > 0, q E C", IJqJJ v = v ( z ) with llvll < 00.
00.
0 5 .x < 0O,
The problem has a unique solution
Proof. All solutions of the differential equation have the form I.
.r
If we set
then v(z) = J,"
eX(zC-Y)q(y)dy, and therefore,
244
Initial-Boundary Value Problems and the Navier-Stokes Equations
Integration in x yields
For an initial value v(0) = vo different from the one given above, the solution shows exponential growth, hence is not in L2. Now consider the diagonal system (7.4.1 1) with boundary condition (7.4.12) at z = 0 ; here s E C, Res > 0, is fixed. Using the previous lemma, we find that the side condition 11C~(.,s)ll < 00 determines a unique solution G ( x , s ) . Then, reversing the transformations used in the proof of Lemma 7.4.7, we obtain G(z, s). The inverse Laplace transform (7.4.7) gives us
'I
u(x,t)= 2'Ta
estG(z, s)ds,
q
> 0.
Res=q
By assumption, g E CF(0 < t < 00). Hence g ( s ) is an analytic function of s, Re s > 0, and the same is true for G(x,s). Also, G(x,s) is a smooth function of z, and JG(z,s)l decays rapidly for Is1 + 00. Therefore, ut -
Au,,
-
's
F =2'Tz
e S t ( s G - AG,,
- I') ds = 0 ,
q
> 0.
Res=q
This shows that u is a solution of the differential equation. Clearly, u satisfies the boundary condition. It remains to show that u(x,O) = 0. By Residue Calculus we can choose any positive value for q without affecting the result u = u ( z ,t ) of the inverse Laplace transform. Therefore,
's
u(z,O)= lim q-m 2'Tz
G(x,s) ds = 0.
Res=q
This completes the proof of Theorem 7.4.1 for f there are no lower-order terms, i.e.,
L,'=O,
= 0 under the assumption that
B=C=O.
Lower-order terms. The case of nonzero lower-order terms can be treated in much the same way. For the vector
Initial-Boundary Value Problems in One Space Dimension
245
one obtains a system
where M ( p ) = A40
1 + 0(-)
I PI
for Ip( large
and M0 is the matrix introduced in the proof of Lemma 7.4.8. Since the eigenvalues of A40 are all different, one can diagonalize M ( p ) by a transformation S(p) = s o
1 + O(-), IPI
The boundary conditions for 2q.r. s) = S(p)-'w(r,s)
take the form Bo(p)6'"'(0, s)
+ B ,( p ) G ( ' ) ( Os), = j ( s )
with
Thus, if IpI is sufficiently large, the estimates for 6 follow as before; the crucial condition detB0
# 0 (edetCo # 0)
remains unchanged. In this way, we obtain well-posedness in the generalized sense for problems with lower-order terms. Thus far we have restricted ourselves to homogeneous initial data f E 0, however.
Inhomogeneous initial data. If f $ 0, we can introduce the function
v(z,t ) = u ( z ,t ) - e-'f(.r) which satisfies homogeneous initial conditions at t = 0. Unfortunately the derivative fxz enters the forcing term of the differential equation for v, and therefore, if we apply Lemma 7.4.8 in a straightforward way, we need
Ilf It2 to estimate the solution u.
Initial-Boundary Value Problems and the Navier-Stokes Equations
246
It is possible, however, to derive an estimate in terms of simplicity we restrict ourselves to an equation ~t = AuzT,
(7.4.13)
11 f 112
only. For
~ ( z0,) = f (x),
and assume boundary conditions (7.4.3) with g = 0, L,' = 0. (Again, lowerorder terms could be treated by a perturbation argument.) Laplace transformation of (7.4.13) yields s4(z, S) = A.Ei,,(z,
S)
+ f(z);
thus the function f(z) enters the discussion in the same way as the function p(z,s) did previously. If det CO# 0 we find, as in Lemma 7.4.7,
C
I I.i"'l fl '. Using (7.4.9) for fixed 17 > 0, T > 0, we obtain an estimate of the solution on the boundary z = 0,
The time integral of IIu(.,t)1I2 can be treated in the same way using (7.4.10b). To summarize, we have shown
Lemma 7.4.11. If det GO# 0, F = 0, g = 0, then the solution of the initial-boundary value problem satisfies
'u
= u ( z ,t )
7.4.6. Extensions We want to sketch some extensions of the previous results without giving the proofs in detail. Strip problems. The results can be extended to strongly parabolic systems in a strip
O
t>o
247
Initial-Boundary Value Problems in One Space Dimension
with boundary conditions of the form (7.4.3) on either side of the strip, .e., at z = O a n d z = 1:
eLfou(j, t )
+ ~ i I u ~ t() j=, g;(t),
~ i i u ( tj ). = g;'(t).
j = 0, I
To check for well-posedness, one considers now the two matrices
instead of the single matrix (7.4.4~);one can show that the strip problem is well-posed in the generalized sense if det Co # 0 and
det CI
# 0.
To sketch a proof of this result, we note that the general solution of sQ(z.S ) = AB,,(z. s ) .
0
5 s 5 1.
is given by G(z, S) = Qo(z,S )
+ B ~ ( z s). .
n
Qn(z.s ) =
C
goli
e x p ( - G x)@k,
g o E C".
k= I
n
k= 1
The vectors no, ~1 have to be determined by the boundary conditions. If we substitute the above function Q ( s , s ) into the boundary condition at z = 0, we note that c r ~contributes a term which is exponentially small for large Re s. Similarly, the contribution of g o is exponentially small at s = 1. For this reason, if Res is sufficiently large, the vectors go = ao(s), GI = ~ I ( s are ) uniquely determined. To derive the proper solution-estimate, we can basically proceed as in the proof of Lemma 7.4.7. Only the scaling-matrix D = D ( s ) must be chosen more carefully:
Here d o ) ,d ' ' ) are positive smooth functions for which the ratios
are sufficiently large (depending on the boundary conditions).
248
Initial-Boundary Value Problems and the Navier-Stokes Equations
Variable coeflcients. The previous results can be generalized to parabolic systems with variable coefficients A = A ( x ,t ) , etc. Also, the coefficients of the boundary conditions are allowed to depend smoothly on time, LI.II
Jk
111
= Lji, ( t ) ,
j , k = 0, 1.
Assuming that A(x,t ) can be diagonalized at x = 0, x = 1, we obtain matrices Cj(t), j = 0, 1. If the determinant condition det Cj(t)# 0 for all t
2 0,
j = 0, 1,
is fulfilled, then the initial-boundary value problem is well-posed in the generalized sense. (See also the remarks at the end of Chapter 8.)
7.5. Mildly Ill-Posed Half-Space Problems Consider a parabolic problem (7.5.1) in 0 5
~t L
< 00,
t
= Au,,
+ Bu, + CU,
A
+ A* 2 251.
T
< 00.
5
> 0,
2 0, with initial condition u(x,O)= 0,
(7.5.2)
05
and boundary conditions at x = 0, (7.5.3)
L,'U(O, t )
+ Lfu,(O,
t ) = g'(t),
L,"U(O, t ) = g"(t),
t
2 0.
All matrices are constant (in general, complex), A , B , C have size n x n, L i , L: have size T x n, and LiI has size ( n - r ) x n. We make the reasonable assumption that L{ and LA' have full rank in order to have n linearly independent boundary conditions. Furthermore, we assume for simplicity that the eigenvalues p(LI,...,p71, R e p k
2 6.
of A are distinct. First we want to use the ideas of the previous section to derive a formal solution formula. Second, we will show that the problem is not strongly well-posed in the generalized sense (see Definition 3 of Section 7.3) unless
Here
Initial-Boundary Value Problems in One Space Dimension
249
Hence there are two different ways in which a problem (7.5.1)-(7.5.3) can become ill-posed: First, there can be a sequence of eigenvalues s , with Re s, 4 00; see Lemma 7.4.3. Second, no such sequence exists, but det CO= 0. In the second case the ill-posedness is of a milder nature: One can still estimate the solution if one uses derivatives of the data. In contrast to the weakly ill-posed Cauchy problems of Chapter 2, a perturbation by lower-order terms still does not lead to arbitrarily fast exponential growth. 7.5.1.
Formal Solution
Laplace transformation of (7.5.1)-(7.5.3) gives us
+ 13Qx(x.S)+ Cci(.r,s).
(7.5.4)
sQ(z, S ) = A i i x x ( x ,s )
(7.5.5)
LgliqO. s ) + L:aE(o.s ) = . ( y ( S ) . Ilii(..s)ll
(7.5.6)
<
L,"C(O, s ) = i y ( S ) , m.
For each fixed s with sufficiently large real part, we want to solve this constantcoefficient problem. The general solution of the differential equation (7.5.4) with side-conditon (7.5.6) reads 71
(7.5.7)
~ ( zs ). =
C
ok
exp(Kk(s).r)4k(s), o = a ( s ) E
c".
k=l
Here
are the roots of
KA. = K ~ ( s )
det (K'A
+ K B+ C - s1) = 0
with Re r+
<0
and 4l~= & ( s ) E C f Lare corresponding eigenvectors,
(It is assumed that Res > 0 is so large that the 2n roots K of the above characteristic equation are distinct and exactly n of them have negative real parts.) Perturbation arguments show that
and one can normalize the eigenvectors
where
A@k
= p k @ k , @A. # 0.
4k(s)
so that
250
Initial-Boundary Value Problems and the Navier-Stokes Equations
then we can write for short G(0, s) = @(s)a,
G,(O, s) = @(s)diag ( K ~ ( s ) ) c T ,
and the boundary conditions (7.5.5) take the form
There are two possibilities: (i) There is a sequence s, E C with Re s, -+ cc for which the above systemmatrix is singular. Then we can argue as in Section 7.4.3 and show that there is no bound on the exponential growth rate (in time) of genuine solutions. Therefore the initial-boundary value problem is ill-posed in any sense. (ii) If R e s is sufficiently large then the matrix in (7.5.8) is nonsingular. In this case let (T
= a ( s ) , s = 71
+ it,
7 sufficiently large,
denote the solution of (7.5.8). The function G(z,s) defined in (7.5.7) solves (7.5.4)-(7.5.6); inverting the Laplace transform, we have formally solved the half-space problem. There are no difficulties in extending the formal solution process to inhomogeneous differential equations and inhomogeneous initial conditions. If all data are sufficiently “well-behaved” then - by the same arguments as before - the formal solution is a genuine C”-solution. Nevertheless, as we will prove in the next section, the problem is ill-posed in the generalized sense if det CO= 0. 7.5.2.
Necessity of the Determinant Condition
Using the previous notations, we show
Theorem 7.5.1. The halfspace problem (7.5.1)-(7.5.3) is not well-posed in the sense of Definition 3, Section 7.3, i f det CO= 0.
251
Initial-Boundary Value Problems in One Space Dimension
Proof. a) We divide the I-part of system (7.5.8) by - p = -& and obtain
By assumption, Co is singular; furthermore, taking R e s sufficiently large, we may assume that
+
det (CO CI(P))# 0. (Otherwise we are in case (i) mentioned in the previous section.) From the rank-assumption for L:, LhI, it follows that there exists a vector
b) Let us outline the rest of the proof. We will construct a sequence of scalar functions T( ~ ) ( ( ) , < E R ,
v=1,2,
... ,
and define data by
+ it) = -p(<) (q : I )
p ( 7 7
1
77 large1 fixed.
For these data we solve (7.5.9) and obtain vectors &“(q
+ it) with
+ i€)l 2 61l p l l ~ ( ~ ) ( O l61, > 0 fixed. 77 + it) of (7.5.4)-(7.5.6), According to (7.5.7), we obtain solutions G(V)(z, (7.5.10)
IO(~)(V
and the inverse Laplace transform gives us functions @(z, t). We will show that
1’
lu(V)(O,t)12dt + oo as v + a,
whereas the data satisfy
1’
Ig‘”)(t)12dt
5 const.
c) The lower bound (7.5.10) is a consequence of the following perturbation result from linear algebra.
Lemma 7.5.2. Let
Suppose that COis a singular n x n matrix and q
+
CO ECI(C)) # 0, 0 < E I eo1 IC,(E)I= 0(1),
4 range CO.
252
Initial-Boundary Value Problems and the Navier-Stokes Equations
and solve
Then 60
Iv(dI 2 -,€
(7.5.1 1)
Proof.
60
> 0.
There is a nonsingular matrix P such that
PCO =
(2)
where DO has full rank, say rankDo = m. There is a component j with
since otherwise Pq E range(PC0). If 60 > 0 with (7.5.1 1) did not exist then
for some sequence E
--$
0, and the j-th equation of
(pco + €PCl(E))!A€) = p q would yield a contradiction. d) To continue the proof of Theorem 7.5.1, we define a sequence of functions y(”)by
fi 0
v=112,....
forv<
Then the &-norm of 7‘”) equals 1, and therefore
.I_,
00
IG‘”’(77
+ iE)I24 5
CI.
According to (7.4.9), the inverse Laplace transforms g ( ” ) ( t ) have bounded norms over 0 5 t 5 1, say. Now invert the Laplace transform of data
L2-
253
Initial-Boundary Value Problems in One Space Dimension
and obtain
Thus one finds
If one observes the lower bound (7.5.10) and notes that the supports of d”) are confined to small intervals for large u, then one obtains a similar result for
Also, for each fixed u we can apply arbitrarily small changes to obey compatibility conditions at t = 0, and the theorem is proved.
7.6. Initial-Boundary Value Problems for Hyperbolic Equations 7.6.1. The Method of Characteristics
In this section we consider hyperbolic systems (7.6.1)
ut
= B ( z ,t)u,
+ C(z, t)u + F ( z ,t)
in the strip 0 5 z 5 1, t 2 0 with initial data
(7.6.2)
u(z,O)= f(z), 0 5 z I 1.
At each boundary point z = 0. z = 1 we prescribe (inhomogeneous) linear relations for u;i.e., we consider boundary conditions of the general form
(7.6.3)
Lou(0,t) = go(t), LIU(1,t) = g1(t),
t > 0.
254
Initial-Boundary Value Problems and the Navier-Stokes Equations
Specific assumptions about the matrices LO, L I will be derived below. The coefficients and data functions are assumed to be Cm-smooth with respect to all variables. Hyperbolicity of the system (7.6.1) requires the eigenvalues Xj(z, t) of B ( z ,t) to be real and assumes the existence of a smooth transformation S = S ( z , t ) such that
S - ' B S = A = diag (XI, . . . ,An), In the interior 0 assume that (7.6.4)
<
z
X j = Xj(z, t ).
< 1 the eigenvalues may change sign. However, we j = 1, ..., n,
X j ( O , t ) and Xj(l,t),
have a constant sign as a function of time; i.e., each function (7.6.4) is either > 0 for all t, = 0 for all t, or < 0 for all t. If we introduce new variables (so-called characteristic variables) 6(z. t ) =
s-yz, t ) U ( Z , t ) ,
then the system (7.6.1) transforms to an equation where B is replaced by A. To simplify notation, we assume that the given system is written in characteristic variables already, thus B = A in (7.6.1).
The case of n scalar equations. To discuss the system, we use the method of characteristics and start with the case C = F = 0. The differential system separates into n scalar problems ujt
j = 1 , . . . , n.
= Xj(Z,t)Uj,,
Thus u j ( z ,t) is constant along the characteristics ( z ( t )t), defined by
dx
(7.6.5)
t).
- = -Xj(Z,
dt
The case of constant Xj.
Assume first that
X j ( z , t ) = X j = const.,
j = 1 , . . . , n.
Then the characteristics are straight lines, and thus Uj(Z,t ) = fj(2
+Xjt),
05
2
+ X j t I:1.
Let ut,uo, u- consist of the variables uj corresponding to indices j with X j is determined by the initial data 0, X j = 0, X j < 0, respectively. Clearly, uo(z1 t ) = fo(z), 0
5 z 5 1, t L 0 ,
>
255
Initial-Boundary Value Problems in One Space Dimension
FIGURE 7.6.1.
I
‘f
I
x=o
u=f
x=l
X
Strip with characteristics.
but we need boundary conditions to determine u+ and U , L . Acceptable boundary conditions are (7.6.6)
.-(O.t)=go(t),
u+(l.t)=.y1(t).
t >O;
i.e., we prescribe the ingoing characteristic variables at each boundary. If the initial function f(x) and the boundary data go(t). g ~ ( t are ) not compatible, then the solution will have discontinuities along the characteristics which start at the comers (2.t) = (0,O). ( z , t ) = (1,O). Thus, in contrast to the parabolic case, there is no smoothing during time evolution here. To avoid difficulties connected with nonsmoothness, we will assume that the data f,go. gl vanish near the comers. As usual, once solution estimates are derived for this case, the more general situation can be treated by a limiting process. The boundary conditions (7.6.6) can immediately be generalized to
One says that the ingoing characteristic variables are described in terms of the outgoing ones. Boundary conditions for the characteristic variables 00 belonging to speeds A, = 0 are neither necessary nor allowed.
The case A, = Al(z, t). For simplicity we assume that all eigenvalues (7.6.4) are different from zero on the boundary; one says that the boundary is not characteristic. If an eigenvalue A,(z, t ) changes sign as a function of T , then possibly the variable uLLI belongs to a positive characteristic speed at .r = 0 and to a negative speed at T = 1. Nevertheless, we use the notation u + and uto assemble the variables uJ with A, > 0 and A, < 0, respectively, at each
256
Initial-Boundary Value Problems and the Navier-Stokes Equations
boundary point. As in the case of constant Xj, we obtain a unique solution u(2,t ) if the boundary conditions have the form (7.6.7). Also, as follows from Section 3.3.2, we can add a diagonal term
COU, CO= diag(c1,. . . , cn), cj = c j ( x :t ) , and a forcing function F ( x 1t). The assumption for the boundary to be noncharacteristic is not essential. By solving scalar equations, one obtains
Theorem 7.6.1. Assume that f , F, go, and g1 vanish in a neighborhood of the corners ( T , t ) = (0,O), (2.t ) = (1 ,0). The system ut = A ( x . t ) u ,
+ Co(r,t)u + F ( 2 , t )
with initial and boundary conditions (7.6.2). (7.6.7) has a unique smooth solution. The solution vanishes near the corners.
7.6.2. Solution Estimates If the coefficient C = C(z.t ) is not diagonal we want to use the iteration uk+I t
- A u kI+ I
-
+Cuk
+ F,
u"I(z.0) = f(2). uo = o,
(7.6.8)
+ go(t). 1, t ) = sl(t)u'"+l( 1. t ) + g1(t)
U!+'fl(O,
Ut+?
t ) = so(t)u:++l(O, t)
to show the existence of a solution. To start with, we show the following basic estimate:
Lemma 7.6.2. Assume that the boundary is not characteristic. For every finite time interval 0 I t 5 T there is a constant h'T independent o f f , F. go, gl with the following property: If u solves (7.6.9)
ut = Au.,
+ Cu + F in 0 5 x 5 1:
and satisfies (7.6.2),(7.6.7) then
for 0 5 t 5 T .
05t5T
257
Initial-Boundary Value Problems in One Space Dimension
Proof. 1) To begin with, let us scale the variables u+, u- such that the matrices So(t), S l ( t ) become "small". Let
D = diag(d1.. . . , d,,),
dJ = d J ( r ,t ) > 0.
and introduce new variables v = Du. Equation (7.6.9) transforms to
and thus only lower-order terms change. The boundary conditions (7.6.7) become
where L ( 0 ,t ) is a diagonal submatrix of D(0. t ) , etc. Clearly, the matrices S,(t) become as small as we please by choosing D ( z . t ) appropriately. To simplify notation, we assume IS01 IS11 to be sufficiently small from the beginning. 2) From (7.6.9) we obtain that
+
( u ,A u , ) = (Au.u,) = - ( A u , ~ U. ) - (AJ U , U )
+ (u.Au) 1".I
and thus
3) Consider, for example, the boundary point r = 1 and note that
258
Initial-Boundary Value Problems and the Navier-Stokes Equations
Here we have assumed SI to be so small that
A similar consideration applies at x = 0, and we obtain that
The lemma follows by integration. We show next how to estimate derivatives of the solution of (7.6.9), (7.6.21, (7.6.7) if the solution is smooth; we let u = u,. Differentiation of (7.6.9) with respect to z gives us PI^ = AV,
+ (A, + C ) U+ C,U + F,.
To obtain boundary conditions for u,we first differentiate (7.6.7) with respect to t,
where IGo(t)l
5 ci { Iu(0, t)l + Igot(t)l + IF(0, tll}.
Here
z{ 1
IF(0,t)I2 I IlFA..t)1I2
+ [IF(.,t)l12}.
Thus we have equations for u = u, which are of the same type as the equations for u. By Lemma 7.6.2 we can estimate bl(lud0,1)l2
+ luA1.T)12}dT + IIU,(.,t)1l2
in terms of go. 91, f, F and their first derivatives.
Initial-Boundary Value Problems in One Space Dimension
259
Differentiation of (7.6.9) with respect to t gives us, for w = ut,
+Cw +E, f;; = Atu, + C ~ + U Ft.
wt = Aw,
Therefore we can also estimate w = ut in terms of go, 91, f , F and their first derivatives. This process can be continued, and we obtain
Lemma 7.6.3. Assume that the initial-boundary value problem (7.6.9), (7.6.2)? (7.6.7) has a smooth solution and that the boundary is not characteristic. The derivatives of the solution satisfy estimates of type (7.6.10). 7.6.3. Existence of a Smooth Solution Assume that the compatibility conditions of Theorem 7.6.1 are satisfied and that the boundary is not characteristic. We consider the iteration (7.6.8). By Theorem 7.6.1 each function of the sequence uk = u k ( x , t ) , Ic = 0 , 1 , 2,...,
is Cm-smooth. Also,
and corresponding estimates for z-derivatives hold. Thus, by Gronwall's Lemma 3.1.1 and Picard's Lemma 3.3.4, the sequence uk is uniformly smooth in any finite time interval. Furthermore,
As before, Gronwall's Lemma and Picard's Lemma imply convergence of the sequence uk to a C"-limit u. The limit u solves the initial-boundary value problem and satisfies the estimates of Lemma 7.6.3. We summarize:
Theorem 7.6.4. Assume that the boundary is not characteristic and that the data go, gl, f , F are compatible at t = 0. The hyperbolic initial-boundary value problem (7.6.9), (7.6.2), (7.6.7) has a unique solution. The solution is a C"-function, which satisfies the estimate (7.6.10). Similar estimates hold for all derivatives. If the initial and boundary data do not satisfy compatibility conditions, then we can approximate the data and go to the limit. In this way we can introduce generalized solutions. As the uncoupled case shows, these will - in general -
260
Initial-Boundary Value Problems and the Navier-Stokes Equations
have discontinuities travelling along the characteristics which start in the comers of the strip. 7.6.4. The Strip Problem vs. the Half-Space and Pure Cauchy Problems Suppose that the coefficients B = A, C and the data F, f are defined for -co < < M, t 2 0. The finite speed of propagation for hyperbolic systems makes it possible to split the strip problem ~t = A(z, U(5,O)
u-m
t ) ~+, C(Z,t ) +~F ( z , t ) ,
0
= fb),
<
1,
t 2 0,
O
t ) = S O W U + ( O , t ) + go(t),
t L 0,
+ g1(t),
t L 0,
u + ( l , t ) = SI(t)u-(l, t )
5
into two half-space problems and a pure Cauchy problem. To this end, let 41 E C" denote a monotone function with 1 for 5 1/6, 0 for z 2 1/3,
and define
First we consider the following three strip problems (here the index j = 1 , 2 , 3 numbers the problem, not a component): ujt
+
= A u ~ , Cuj
+ 4jFj,
U j ( Z , 0) = 4j(Z)f(Z),
.j-(O,
05x51, t20, OlZ51,
t ) = So(t)q+(O,t ) + 4j(o)go(t),
t 2 0,
+ 4$1)9l(t),
t L 0.
q + ( l , t ) = Sl(t)uj-(l,t)
Clearly,
solves the given system. The finite speed of propagation implies that there is a time interval 0 5 t 5 TI, TI > 0, where u ~ ( zt), = 0 for 5/6 5 2 5 1. Therefore, we can consider U I as the solution of the right half-space problem
261
Initial-Boundary Value Problems in One Space Dimension U I= ~
Ul(X,O)
Aulz
+ C U I+
x 2 0,
IF,
= dl(X)f(X),
u1-(0, t ) = So(t)w+(O,t )
2
+ go(t>,
t 2 0,
L 0,
t 2 0,
at least for 0 5 t 5 T I . Similarly, u2 and 213 can be considered locally as solutions of a left half-space and a pure Cauchy problem, respectively. These considerations are valid in some finite time interval 0 5 t 5 7'0;at time TOone has obtained a new initial function and can restart. Thus, in principle, we can solve the strip problem by solving half-space and pure Cauchy problems. The strip problem is well-posed if the corresponding half-space and pure Cauchy problems are well-posed. As in Sections 7.4, 7.5, one can employ the Laplace transform in time to discuss boundary conditions which are much more general than the conditions (7.6.7). We return to this technique in Chapter 8 to treat problems in more than one space dimension. 7.6.5.
Equations Not in Characteristic Variables
In many applications the differential equation (7.6.1) is not given in characteristic variables, i.e., the matrix B is not diagonal. To test for well-posedness under boundary conditions, one can try to derive energy estimates directly without diagonalizing the system. If B = B* then
Thus the boundary conditions have to provide bounds for
Consider, for example, the boundary point z = 1 and assume that B(1,t ) has T positive and n - r negative eigenvalues; hence there are r ingoing and n - r outgoing characteristics. This suggests specifying T independent boundary conditions at x = 1 , for example, L I u ( l , t ) = g l ( t ) , L I of size
T
x n, rank L1 = r.
Using the boundary conditions, one can eliminate r variables uj( 1, t ) in the quadratic term
262
Initial-Boundary Value Problems and the Navier-Stokes Equations
Similar considerations apply at z = 0. If the remaining quadratic terms have the correct signs, then an energy estimate can be derived. In this way one has avoided the transformation to characteristic variables. A difficulty of this approach is that it provides only sufficient conditions for well-posedness. It might well happen that quadratic terms with the wrong sign appear, the problem being well-posed nevertheless. For the case where we first transform to characteristic variables, this is reflected in our additional assumption that ISo(t)( ISl(t)(is sufficiently small: compare the proof of the basic estimate of Lemma 7.6.2. In applications hyperbolic differential equations often appear as second-order equations. By introduction of auxiliary variables, these can be written as firstorder systems, however. We refer to Sections 2.1.4 and 3.3.3 for two simple examples.
+
7.7. Boundary Conditions for Hyperbolic-Parabolic Problems In this section we treat mixed systems in the strip 0 5 z 5 1, t 2 0, under initial and boundary conditions. For the uncoupled systems we assume a form as described in Section 7.2 (parabolic case) and Section 7.6 (hyperbolic case). Then we allow certain coupling terms in the differential equation and in the boundary conditions. The resulting systems are shown to be well-posed. We give an application to the linearized compressible Navier-Stokes equations.
7.7.1. The Basic Estimate for Mixed Systems Consider a parabolic system 2 ~ t=
in the strip 0 5
3:
5
A ( z , t)U,,,
1, t
A
+ A* 2 261,
6 > 0,
2 0, with boundary conditions
L;,(t>%O.,t ) + Lfo(t)uCi,t ) = h,(t), L;;(t)uO., t ) = 0, j = 0, 1. For each fixed t we assume the conditions formulated in Theorem 7.2.7 to be fulfilled (see also Lemma 7.2.1). We allow the matrices Lfl, etc. to depend smoothly on t but assume that the rank r j of Lfl is constant.
Initial-Boundary Value Problems in One Space Dimension
263
Consider further a hyperbolic system ut =
A(z, t)u,.
A real diagonal,
in the same domain with boundary conditions v-(O, t ) = So(t)v+(O,t )
+ .qo(t),
v + ( l , t ) = Sl(t)v-(l.t)+gl(t);
i.e., the ingoing characteristic variables are expressed at each boundary point in terms of the outgoing ones. (See Section 7.6.1 for notations.) We want to discuss the coupled system (7.7.1) (7.7.2)
+ BIIU,+ B I ~ w+, C I I U+ C I ~+UF, ut = Au, + + C ~ I+UC 2 2 ~+ G
ult = Au,,
with boundary conditions
(7.7.3) L;I(t)u&,
t)
+ Lfo(t)u(j,t ) + hf,(t)u(j,t ) = h,(t), L;,’(t)uCj, t ) = 0,
(7.7.4)
+ &(t)U(O,
(7.7.5)
v-(O, t ) = So(t)v+(O, t )
(7.7.6)
~ + ( l , t= ) Sl(t)v-(l,t)+
t)
j = 0, 1,
j = 0, 1,
+ go(Q
Rl(t)~(l,t) +gl(t).
and initial conditions (7.7.7)
u ( z ,0) = f(2), u(2,O) = #(z),
05
2
5
1.
The coefficients B1 I = B II ( 2 ,t ) , etc. and all inhomogeneous terms are assumed to be C“-smooth. We first assume the existence of a solution and show
Lemma 7.7.1. Suppose that the boundary is not characteristic for the hyperbolic system; i.e., A(0, t ) and A( 1, t ) are nonsingular. In any finite time interval 0 5 t 5 T we can estimate
in terms of
Proof. a) First note that one can easily extend Lemma 7.2.1 to inhomogeneous equations as follows: If condition (ii) of the lemma is met and
264
Initial-Boundary Value Problems and the Navier-Stokes Equations
then I(w, Aw,)l
5 c{ Iwl2 + lhI2}
for some constant c. b) As explained in the proof of Lemma 7.6.2, we can assume without loss of generality that IS01 + IS11 is sufficiently small. We let A+(O,t) 2 71,
A - ( l , t ) 5 -71,
0 5 t 5 T,
y > 0.
265
Initial-Boundary Value Problems in One Space Dimension
e) We take a
> 0 sufficiently large, and the above estimates give us that
+
c
( lhj(t)12+ 1.9j(t)l2)}.
j=O,I
Another application of (7.7.8) and integration with respect to t finishes off the proof of the lemma. 7.7.2.
Estimates of Derivatives and Existence of a Solution
If we differentiate the u-equation (7.7.1) with respect to t we obtain ~
Utt
+ Atu,, + . .. .
= Au~,,
Here u,, can be expressed by u t , etc. using (7.7.1) again. Thus uxx and u, can be treated like zero-order terms as in the proof of Lemma 7.2.4. The v-equation (7.7.2) is differentiated with respect to t and with respect to x. One obtains a system
Boundary conditions for ut and vt follow by differentiation of the given boundary conditions with respect to t ; then boundary conditions for V , are obtained if we replace vt by v, using the differential equation vt = Au, . . . . Thus
+
266
Initial-Boundary Value Problems and the Navier-Stokes Equations
we have a system for ( u t , u t , u,) which has the same structure as the given system for ( u , u). Consequently, estimates for u t , u,, uzz, u t r u, are derived. The process can be continued, and all derivatives can be estimated. If we assume that all data
F ( z ,t ) ,G(z, t ) ,h j ( t ) ,9j(t), j = 0, 1 >
f(.>1#4z>,
vanish in a neighborhood of the comers of the strip, then existence of a smooth solution can be shown by using the iteration uk+l
t
uk+I t
+ +B12Vk + + C 1 2 V k + F, = A u, ktl + B ~ ~ u +EC2+'uk+ C22uk++'+ G.
= Auk++' ,1 Bl1u:+'
CllUk++'
The boundary conditions for uk+l are the same as those for u except that u is replaced by uk in (7.7.3). Similarly, u is replaced by uk in ( 7 . 7 3 , (7.7.6). This proves
Theorem 7.7.2. Consider the hyperbolic-parabolic strip problem (7.7.1)(7.7.7). Assume that the boundary is not characteristic for the hyperbolic part; i.e., A(0, t ) and A( 1, t ) are nonsingular. If the compatibility conditions are satisjied, then the problem has a unique smooth solution (.(.-, t ) , ~ ( xt ),) . We can estimate the solution and its derivatives in terms of the data and their derivatives. 7.7.3.
The Case of a Characteristic Boundary
We now allow one or both of the boundaries 11: = 0 , x = 1 to be characteristic for the u-equation ~t = Au,
+. .. .
The boundary conditions ( 7 . 7 3 , (7.7.6) for u remain unchanged, hence none of the characteristic variables uo appear in the boundary conditions for u. For the variable u we restrict ourselves to boundary conditions of Dirichlet type u ( j ,t ) = 0,
j = 0, 1.
(If the boundary z = 0, say, is not characteristic, we can allow a boundary condition of the more general form (7.7.3), (7.7.4) at z = 0.) To show the basic estimate, we proceed as in the proof of Lemma 7.7.1. From integration by parts we obtain the boundary terms ( u ,A%)
,;I
(u, B12V)
,;I
. ;1
(u, Au)
The first two of these terms are zero, the third term is treated as before:
Initial-Boundary Value Problems in One Space Dimension
267
in terms of the data. Bounds for derivatives can be derived as before. To summarize:
Theorem 7.7.3. The result formulated in Theorem 7.7.2 remains valid if one or both of the boundaries x = 0 , x = 1 are characteristic provided that the boundary condition for u at a characteristic boundary is of Dirichlet type. With some restrictions, we found that coupled hyperbolic-parabolic systems are well-posed if the uncoupled systems have this property. It is possible to relax the assumptions of Theorem 7.7.3 further; however, there can be difficulties if the hyperbolic part is characteristic at the boundary and the parabolic part has a non-Dirichlet boundary condition. (The difficulties arise from the boundary term (u, B I ~ v )Actually, . in one space dimension, the difficulties can be overcome since the characteristic variables satisfy ordinary differential equations along the boundary. This technique does not generalize to more than one space dimension, however.) In any concrete case, one can try to use the above tools to derive an energy estimate and estimates for derivatives. Also, the method of Laplace transform is applicable for discussing much more general boundary conditions. 7.7.4.
Application to the Linearized Navier-Stokes Equations in 1D
Upon neglecting zero-order terns and forcing functions, the equations for u', p' derived in Section 3.5 read
We assume that
> 0. Clearly, the uncoupled equations u; = -uu;
+ p,ukx,
P; = -UP:
are parabolic and hyperbolic, respectively. The base flow U = U ( x ,t) is assumed to be known in the strip 05xl.1,
t>o.
268
Initial-Boundary Value Problems and the Navier-Stokes Equations
Consider the boundary x = 0, for definiteness. We distinguish among three cases: 1) inflow at 2)
2 =0
: U(0,t ) > 0;
outflow at x = 0 : U(0,t ) < 0;
3) a wall at
2 =0
: U ( 0 , t )= 0.
Our results do not cover a switch between inflow and outflow in time, since we assumed in Section 7.6 that the eigenvalues A,(O,t) have constant sign. The general theory allows boundary conditions of the form given below. Case 1. U ( 0 ,t ) > 0. Here p’ is an ingoing characteristic variable. We need two boundary conditions: p’@, t ) = ro(t)u’(O,t )
+ go(t)
and
u’(0,t)= 0
(7.7.9) (7.7.10)
u:co,
or
+
t ) lo(t)u’(O,t ) = rno(t)p’(O, t ) + ho(t).
U ( 0 ,t) < 0. In this case p’ is an outgoing characteristic variable and need not be specified. For u’(0,t) we can take condition (7.7.9) or (7.7.10).
Case 2.
U ( 0 ,t) = 0. The variable p‘ need not be specified. For u’ we can take (7.7.9).
Case 3.
Similar considerations apply at x = 1. By Theorem 7.7.3 the resulting strip problem for the coupled (u’, p’)-system is well-posed. Instead of the homogeneous condition (7.7.9), one could also prescribe a smooth function
u’(0,t ) = u;)(t). The inhomogeneous case can be reduced to the homogeneous one by subtracting a suitable function from u’(x,t).
7.8. Semibounded Operators In the previous sections we have considered differential equations ut = P ( x ,t , 8 / 8 x ) u
+ F ( x ,t )
Initial-Boundary Value Problems in One Space Dimension
269
in the strip 0 5 z 5 1, t 2 0, together with an initial condition
and boundary conditions. Restricting ourselves to the homogeneous time independent case, we write the boundary conditions in the form L j U C j , t ) = 0,
j = 0.1.
Here we assume that L, is a linear operator which combines values of u and its spatial derivatives evaluated at (2, t ) = ( j . t ) ,j = 0, 1. In most cases our proofs of an energy estimate followed from an inequality of the type
Pu)
= (21.
+ ( P u ,u ) + ( u ,F ) + ( F ,u )
I 2all4I2 + 211~11IlFll. Thus the critical question is whether we can show an estimate (21, Pu)
+ ( P u ,u1L) 5 2 4 ~ 1 1 2
if u satisfies the boundary conditions. We shall now formalize the procedure to some extent. For every fixed t the differential expression
P ( z ,t , alaz) defines an operator P' if we specify its domain of definition D. Let us define
(7.8.1)
D = {w E C" : Low= 0, L , w = O};
i.e., D consists of all C"-functions which satisfy the boundary conditions. The following definition formalizes our requirement:
Definition 1. We call the operators P ' , t 2 0, semibounded on D if there exists a constant a such that Re
(211,
P'uJ)5 (Y 1(u~11~
for all t 2 0 and all w E D. Clearly, if the operators P t are semibounded on D and if the strip problem has a solution u with u(.,t) E D for each t , then our considerations show
d
dt
ll4I2I 2all4I2 + 1I4l2+ lF1I2
Thus uniqueness and the basic energy estimate follow.
270
Initial-Boundary Value Problems and the Navier-Stokes Equations
One might be tempted to believe that the existence of a solution u with
~ ( . , tE)D can also be shown once the operators P t ,t 2 0, are semibounded on D. However, such a result cannot be valid without further assumptions: If we change the domain D to Dl c D by requiring additional boundary conditions, then the corresponding operators P: are still semibounded; any solution u with
u(.,t)E D1 would satisfy the additional boundary conditions. Obviously, this cannot be expected. In other words, a general existence result of the above type cannot be valid since one might have overspecified the solution at the boundary. This motivates the following:
DeBnition 2. Suppose that P t , t 2 0, is semibounded on a domain D of the form (7.8.1) and that D is determined by q linearly independent boundary conditions. Suppose further that q is minimal; i.e., if we specify a domain Dl by less than q boundary conditions, then the corresponding operators P: are not semibounded. In this case, one calls Pt maximal semibounded on D. (This concept is motivated by the next theorem. It is not sufficient to request that Pt lose semiboundedness on all domains D I strictly larger than D. For example, suppose that integration by parts leads to a boundary term u(u, +u,,). If one requests the two boundary conditions u, = u,, = 0, then one cannot drop any condition. The correct condition is u = 0, however.) In the examples which we discussed previously the operators Pt were indeed maximal semibounded; there was no overspecification and - under suitable compatibility conditions - we could show the existence of a solution. One can prove the following general result:
Theorem 7.8.1.
Consider a system of the form
with boundary conditions
2
a"
BjvGu(j,t)=O,
j=O,l,
tzo.
u=o
Suppose that A,(x, t ) is nonsingularfor all x, t and that all coefficients are C" smooth. If the associated operators Pt , t 2 0, are maximal semibounded on the
271
Initial-Boundary Value Problems in One Space Dimension
corresponding domain D , then the initial-boundary value problem is well-posed. Especially, for initial data f E CF(0, I ) , there is a unique solution u E C X ( O < r L l,t_>O)
wirh u(.,t ) E D for t 2 0. Let us apply the concept of maximal semiboundedness to some simple examples.
Example 1.
Consider the equation u t = u, under boundary conditions
Here
+
(w, w,) (wr,U l ) = IwI
lo = IUWl2 - lU1(0)l2.
2 1
An estimate by 2all~11~ is possible only if the boundary conditions imply w(1) = 0. At x = 0 no boundary condition is allowed if the operator P = d / d x is to be maximal semibounded.
Example 2.
Consider a system ut = Aux, A real diagonal,
where A is constant for simplicity. Here
(w, Aw,)
+ (Aw,, w)= ( w ? AW)lo
1
+
= ( w + ( l ) , A + W + ( ~ ) ) (w-(1), A - U ] - ( ~ ) ) - (w+(O), A+w+(O)) - (w-(O),
A-w-(O)).
In order to obtain the desired estimate, we need boundary conditions of the form w + ( l )= S , w - ( l ) ,
+
w-(O) = Sow+(O),
where IS01 IS1 I must be sufficiently small. If the boundary conditions have the above form, but /Sol I S11 is not small, then the operator P = h d / d x is not semibounded on the corresponding domain. Nevertheless, one can derive an energy estimate as we have shown in Lemma 7.6.2. Thus semiboundedness is sufficient but not necessary for an energy estimate.
Example 3.
+
Consider the linearized Korteweg-de Vries equation Ut
= u,
+ hu,,,,
5
> 0,
272
Initial-Boundary Value Problems and the Navier-Stokes Equations
and assume the functions are real. Here 2(w, w,
+ 6w,,,) = { w2 + 26WW,,
- 6(W,)2}
lo. I
If we want an estimate by 2 ~ r ) ) wthen ) ) ~ the boundary conditions must imply
+ 26W( l)'UJzz(1 ) - 6W:( 1) 5 0, w2(0)+ 26w(O)w,,(O) 6w;(o) 2 0.
(7.8.2)
W2(
(7.8.3)
1)
-
At z = I we need one boundary condition, for example, w(l) = 0. Another possibility is (7.8.4)
~ ~ ~ =(aw(1) 1 )
+ bw,(l).
For the left-hand side of (7.8.2) one obtains the quadratic form (1
+ 26a)W2(1) + 26b'UJ(I)Wz( 1) - 6 W s ( 1)
Condition (7.8.2) is satisfied if and only if both eigenvalues of the above 2 x 2 matrix are 5 0. This yields a restriction for the coefficients a, b in the boundary conditions (7.8.4). At z = 0 we need two boundary conditions. One possibility is w(0) = w,(O) = 0.
We can also require wz(0) = cw(O),
WZZ(0)
= dw(O),
and (7.8.3) becomes equivalent to 1 + 26d - 6c2 2 0. If we impose any of these boundary conditions to the KdV equation, then the strip problems are well-posed according to Theorem 7.8.1.
Notes on Chapter 7 The Laplace transformation and expansions into eigenfunctions have been used for a long time in applied mathematics. See, for example, Carrier and Pearson (1976). Our aim was mainly to show that the energy method is rather restrictive with respect to the admissable boundary conditions, though it is very powerful when it applies.
Initial-Boundary Value Problems in One Space Dimension
273
The proof of Theorem 7.8.1 is conceptually rather simple. We obtain immediately the basic energy estimate. Then, in the same way as for parabolic equations, we can estimate the time derivatives. This provides bounds for the 2-derivatives. Corresponding estimates for suitable difference approximations (Kreiss (1960)) can be obtained in a similar way, and the existence of a solution follows as in the text.
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8
Initial-Boundary Value Problems in Several Space Dimensions
In Chapters 3 to 6 we have assumed spatial periodicity, and Chapter 7 treated the case of one space variable 0 5 z 5 1 or 0 5 x < 00. Here we want to combine the two situations and consider a space variable z = (q,. .. ,xs),
0
I zI 5
1 or 0
I zI< m,
under periodicity assumptions in 2 2 , . . . , 2,. These special z-domains are fairly representative in the sense that problems posed in other domains (with smooth boundary) can be broken up into subproblems which can be transformed to the special cases.
8.1. Linear Strongly Parabolic Systems 8.1.1. General Assumptions We consider second-order systems Y
S
(8.1.1)
ut =
C ZJ=I
A,,D,D,u
+C
B,D,u
+ CU+ F,
Dz= a/i3xZ.
z=I
in the strip.
2 75
276
Initial-Boundary Value Problems and the Navier-Stokes Equations
At time t = 0 we give initial data (8.1.3)
u(Z,o) = f(.)l
and at the surfaces 21
= 0,
21 =
1
we prescribe linear (inhomogeneous) boundary conditions combining u and Dl u. Introducing the notation
Y=
. l ZS),
(Z21..
we can write the boundary conditions in the general form (8.1.4)
LjOucj, Y1 t ) + LjlDlu(j, yl t ) = .9j(y, t ) , j = 0, li
where L,o = L,o(y,t), LJI = LJl(y,t),j = 0, 1, are n x n matrices. The coefficients A,, = A Z J ( xt ,) , etc., the forcing F = F ( z , t ) , the initial function f = f(z),the inhomogeneous boundary terms g, = g j ( y l t ) , and the coefficients L,, = L,,(y, t ) of the boundary conditions are all assumed to be Cm-smooth, I-periodic with respect to x2,. . . , z,~,and real, for simplicity. The differential equation (8.1.1) is assumed to be strongly parabolic;* i.e., there exists b = 6~ > 0 such that S
(8.1.5) i,j=l
i=l
for all vectors € 1 , .. . ,tSE R" and all The n x 2n matrices
t ) in the strip (8.1.2) with 0 5 t 5 T .
(2,
(LjO(Y, t ) , Lj I ( Y l t ) ) are assumed to have rank n for all arguments, but further assumptions about the boundary conditions are needed for well-posedness. We try to determine a solution u = u ( z ,t ) with values in R" which is Cm-smooth and 1-periodic in each variable 2 2 , . . . ,z,. As before, if we want u to be smooth in the strip (8.1.2) including the boundaries of the domain at t = 0, we need compatibility conditions to be satisfied. The data
f<.>, F ( z , t ) ,gj(~,t ) , j = 0 , 1
(where
2
= (21, Y)),
*The definition given here coincides with our terminology in Section 6.1 since the expressions A,, D,D,uand D, A,, D,u differ only by a lower-order term.
277
Initial-Boundary Value Problems in Several Space Dimensions
fulfill suficient compatibility conditions if they vanish identically in some neighborhood of all points
(zI = 0 , y, t = 0) and
(zl = 1. y,
t = 0).
Notation. The inner product and norm in this section are given by rl
Integration by parts. Let u = u(x),v = I-periodic in x2,. . . ,x,. Then (8.1.6)
(u,D1v) = -(DIu,v)
(8.1.7)
( u ,DiV) = - ( D i U , V ) ,
V(X)
be smooth functions of x,
+ (u,v,rlo,I 2
= 2 , . .. ,s.
8.1.2. Neumann Boundary Conditions For illustration, we will concentrate on so-called Neumann boundary conditions, which we write in the form
278
Initial-Boundary Value Problems and the Navier-Stokes Equations
Lemma 8.1.1. Suppose that the smooth function u solves the parabolic problem (8.1.1) with initial condition (8.1.3) and boundary conditions (8.1.8). There is a constant h-T independent of F, go, g1 with f l
in 0 5 t 5 T . Here
Proof. From the differential equation (8.1. l), integration by parts (8.1.6), (8.1.7), and the parabolicity assumption (8.1.5) we obtain that
c Y
5 -6
llDi~112 + c2{ 11u1I2+ IIFII'}
+ ( U , AIIDIU)rl;.
i= I
We can use the boundary conditions (8.1.8) to replace D I Uin the above boundary term by u, 90: 91. The one-dimensional Sobolev inequality
can be integrated with respect to y to yield
(8.1.9)
lw112r,
+ llw112r, I fllDlwll2+ c(41wl12.
Therefore we obtain that d dt
-
6
llu1I2I -2
c "
llDi4I2 + c3{ 11412+ lF1I2+ 11g112r)
i=l
Another application of (8.1.9) and integration with respect to t proves the lemma. We show next how to estimate derivatives; we write Dt = d / d t for time differentiation. We apply one of the operators
Dtl D21...1Ds
279
Initial-Boundary Value Problems in Several Space Dimensions
to (8.1.1) and obtain
c S
( D ~ u=) ~
(8.1.10)
A,, DtD,(Dbu) + terms of order 5 2 .
z.,=I
k = t , k = 2 . . . . ,s. (Since we do not get boundary conditions for D Iu, we do not apply the operator D I to (8.1.1).) Introducing the vector
.. . D,u)
u = ( D ~ u0,2 2 1 . .
E R’L5,
we can write the above system (8.1.10) as
c S
(8.1.11)
at =
D, D, g + ...,
A
-IJ
1.,=1
where /IZJ is the block-diagonal matrix
0
‘42,
4,
A . =
E R’-’BX’’S.
--‘J
0 The terms not written out in (8.1.10) contain
0:.
and
D1u.
Noting that All is nonsingular (see (8.1.5)) and using the given differential equation (8.1.1), we can express D:u by ut,
DID2u, etc.
Therefore, D:u and D l u can be estimated in terms of F. 1 and the first derivatives of g. A key observation is that we can easily derive boundary conditions for 1.An application of one of the operators D t , D2.. . . . D, to (8.1.8) yields
k = 2 ,... S.
D I D ~ u = S ~ D ~ . U ++D( D ~ k. ~S JJ) u , k = t , at each boundary
(8.1.12)
S I = J = 0.
= J = I . With the same notation as before,
DIG(% Y,t ) = S,G(j, Y,t )
+ .y:”(Y.
t).
Thus we have boundary conditions for of the same structure as those for u . It is important to note that the inhomogeneous data g:l)(y. t ) ,
j = 0,1.
280
Initial-Boundary Value Problems and the Navier-Stokes Equations
can be estimated in terms of the first derivatives of the given boundary data gj(y, t) and the U-values on the boundary. The latter have already been estimated in Lemma 8.1.1. Thus we have a parabolic system (8.1.1 1) for 21 under Neumann boundary conditions (8.1.12). Lemma 8.1.1 applied to this problem gives us estimates for a, i.e., for ut, D ~ u. ,. . ,D,u.
To bound D ~ u we , take the inner product of (8.1.1) with u and integrate by parts. This yields
+
( u ,u t ) = ( u , A ~D ,: U ) . . . = - ( D I u , A I I D I U )... +
5 - 6 1 1 0 1 ~ 1 1+~ . . . . Thus we obtain bounds for 1101~11~ also. This process can be continued, and inductively one obtains
Lemma 8.1.2. Suppose that the smooth function u solves the initial-boundary value problem (8.1. I ) , (8.1.3), (8.1.8). In every finite time interval we can estimate u and its derivatives in terms of the data f, F, go, 91 and their derivatives. Assume that compatibility conditions for the data f, F, go, g1 are satisfied. To show the existence of a smooth solution u, we can again use a difference scheme. Proceeding as in the continuous case, we can prove estimates for the solution v = v h of the difference scheme independently of the step-size h > 0. There are no essential differences from the case of one space dimension treated in Section 7.2. The periodic variables 2 2 , . . . ,x, are discretized as in Section 3.2. One obtains Suppose that the data f,F, go, 91 are compatible. The parabolic problem (8.1.l), (8.1.3) under Neumann boundary conditions (8.1.8) has a unique smooth solution. One can estimate the solution and its derivatives in terms of the data and their derivatives.
Theorem 8.1.3.
8.1.3.
Other Boundary Conditions
If the matrix Ljl = Ljl (y , t ) in (8.1.4) is singular but of constant rank can write the boundary conditions as Lfo~Cj,y, t )
+ Lf1D I u C ~y,,t ) = g;(y,
t ) , L f i ~ ( jt ), = 0 , j
7-j.
= 0, 1,
we
281
Initial-Boundary Value Problems in Several Space Dimensions
after we transform the Dirichlet part to become homogeneous. To derive an energy estimate, we can proceed as in one space dimension, see Section 7.2. If either L,I = 0 (the pure Dirichlet case) or if at each boundary point algebraic conditions as in Lemma 7.2.1 are met, then the problem is well-posed. Also, more general boundary conditions can be treated via localization, Laplace transform in time, and Fourier expansion in 22,.. . , T,. We refer to Section 8.4 where we will illustrate this technique for hyperbolic problems.
8.1.4. General Domains We want to indicate how our results can be extended to more general domains. Consider the example (8. I . 13)
u t = u,,
+ uyy
for
T
= .r2 + y 2
5 I.
with a boundary condition
Bu=O
(8.1.14)
at r = l .
As usual, u(..O) = f is given at t = 0. Let cp = ~ I ( T denote ) a monotone C”-function with PI(r.) =
1 for
T
2 1 - 6,
0 for
T
5
1 - 26,
0 < b < 1.
If we introduce the notations cp2 = 1 - P I , u j = pju. .j = 1. 2, then u = u I +u2, and we can write (8.1.13) as a system for z l l ! 212 :
I
FIGURE 8. I . I .
Circle and annulus.
282
Initial-Boundary Value Problems and the Navier-Stokes Equations ujt = U J r z
-
+ u j y y - 2PJZ(u1r + 212.4 - 2PJy ( u l y + '1L2,) + ( P j y y ) (u1 + u2). j = 1, 2.
(PJX"
To motivate the following, we first neglect lower-order terms and write vj instead of u j . Then we obtain the two separate equations ~
j
=t u j r r
+ vjyy,
J = 1,2.
Since u1 = 0 for T 5 1 - 26, we consider the equation for 1 - 26 5 T 5 1 under boundary conditions
Bvl = 0 at
T
= 1,
u1 = 0 at
T
VI
in the annulus
= 1 - 26.
This problem is of the type which we have treated, because we can map the annulus onto a periodic strip by the introduction of polar coordinates. Similarly, u2 = 0 for T 2 1 - 6, which motivates the consideration of a pure Cauchy problem for 212 with "boundary condition" Ilv2(., t)ll < 00. To treat the full problem, we define the iteration
.y1"
=
IL+I
+
UJSS -
((PJX"
urL+I
Jyy
- 2PJZ (G+ u;rLs) - 2PJ,
+ PJYY)(u; +$),
J = 1.
2,
(4, + u;",) n = 0, l , . . . .
Here the functions uL;L+I are determined in the annulus subject to the boundary conditions of vl; the pure Cauchy problem is solved to determine u;". The initial conditions are u:+'(.. 0) = pJf. In a similar way as for the iterations discussed before (see, for example, Section 4.1.4), one can use Gronwall's Lemma 3.1.1 and Picard's Lemma 3.3.4 to show uniform smoothness and convergence as n + 00. The function u = U I u2, uJ = limuy, solves the given problem. A similar procedure can be used to treat problems in rather general domains with smooth boundaries.
+
FIGURE
8.1.2. Domain and boundary strip.
283
Initial-Boundary Value Problems in Several Space Dimensions
8.2. Symmetric Hyperbolic Systems in Several Space Dimensions In this section we consider first-order systems
c V
(8.2.1)
ut =
Bz(x,t)DiU
+ C ( x ,t)u + F ( x ,t )
i=l
in the strip
0521L1,
-oo<x2
) . . . ’x s < o o :
t>o,
under initial conditions (8.2.2)
Nx,O) = f(x)
and boundary conditions at 21 = O,xl = 1. As before, all quantities are assumed to be real, for simplicity, Cm-smooth, and 1-periodic in x 2 ! . . . ,x,. This assumption applies also to the boundary conditions specified below. An essential assumption is the symmetry Bz(Z, t) =
Bt(2,t)’ i = 1:. . . , s ;
i.e., we have a symmetric hyperbolic system. We will also discuss such systems in the half-space O < x ~ < o o , -m<x2
,..., x , < m
for t > O ,
and in more general domains. Our main emphasis is to show that the problem becomes strongly well-posed under certain boundary conditions. In the next section we apply our results to the linearized inviscid compressible NavierStokes equations. If one of the boundaries xI = 0 or 21 = 1 is a wall, then naturally the u-component of the base flow vanishes there. In this case, as we will see, the corresponding boundary is characteristic. A complete discussion of this situation would be very complicated in several space dimensions. For a characteristic boundary we will restrict ourselves to the treatment of some special cases.
8.2.1. The Basic Estimate and Bounds for Derivatives After transforming the independent variables u,if necessary, we can assume that
284
Initial-Boundary Value Problems and the Navier-Stokes Equations
is real and diagonal. First let us assume that B I = A is nonsingular for all arguments. Then, without restriction,
We partition the variables u correspondingly into
As motivated by the discussion in one space dimension (see Section 7.6), we consider boundary conditions at 21 = 0,21 = 1 of the form
(8.2.3)
u-(O, Yl t ) = SO(Y!t).+(O,
u+(l,y,t) = S
Y! t ) + SO(Y,t ) , Y
l ~ Y l ~ ~ ~ - ~ ~ l Y l ~ = ~ (X21...1Zs). + ~ l ~ Y l ~ ~ l
Here SO,SI are matrices of appropriate dimensions. Difference between one and more space dimensions. There is a significant difference between the cases of one and of more space dimensions: In one dimension, we could force the matrices SO,SI to become “small” by applying a suitable transformation to u, if necessary; see the proof of Lemma 7.6.2. If we were to apply such a transformation here, the matrices B2,. . . , B, would lose their symmetry, in general. The symmetry is essential, however, for deriving the estimates for well-posedness by the energy method. For this reason, the assumption IS01
+ IS1I
“small”,
which we need below, constitutes a real restriction on the boundary conditions (8.2.3). The question remains whether or not it is possible to show wellposedness by other means if IS01 + IS1I is large. We will employ the method of Laplace transform in Section 8.4 to discuss this question. It turns out that wellposedness can indeed be lost if [Sol+ IS1I is not small. In one space dimension this is not possible. The basic estimate. We want to show first
Lemma 8.2.1. Suppose that u(x,t ) is a (real) smooth solution of (8.2.1)(8.2.3) which is I-periodic in x2!.. . 2,. If
ISO(Y1 t)l
+ I S l ( Y 1 t)l
285
Initial-Boundary Value Problems in Several Space Dimensions
is suflciently small f o r all arguments, then for any finite time interval 0 there is a constant h7T with (8.2.4)
114.)t)1I2+
s
It 5 T
t
11~(., ~)ll: d.r I K T { Ilf 112 +
0
/{IM.,.r>llF +
[IF(., T)II’} d.r}
0
for 0 5 t 5 T . The constant KT does not depend on f , F , or g .
Proof.
The differential equation (8.2.1) gives us that d dt
2
- 11u(., t ) ( ( = 2(u, ut)
2=
1
For i = 2 , . . . , s, ( u ,B,D,u) = (B,u. D,u) = -(B,D,u, u ) - ((DLBL)U,u )7
and thus ( u ,BzD2u) I c2
11U1I2.
For i = 1 we obtain an additional boundary term. Therefore d
dt
I
1 1 ~ 1 1I~ ~ ~ { I +I IIFII’} ~ I I +(u,Au)rlo. ~
Since IS01 + ISII is assumed small, we can treat the boundary term in exactly the same way as in one space dimension (compare the proof of Lemma 7.6.2) and obtain that (8.2.5)
1
7
( u , ~ u ) r lI , -7
2
2
IIuIIr + Q IIgIIr.
Integration of the resulting inequality with respect to t proves the lemma. We will show belo,w the existence of a smooth solution if the data are compatible. Then the estimate of the previous lemma states strong well-posedness of the hyperbolic initial-boundary value problem. In obtaining the basic estimate, we have not used that B , = A is nonsingular. In the case that A has zero eigenvalues at the boundary, we can obtain a similar estimate to (8.2.4) if we replace the boundary term on the left side by
286
Initial-Boundary Value Problems and the Navier-Stokes Equations t
J IIu*(., OII: d<. 0
Zero eigenvalues of B I = A cause difficulties, however, if we want to estimate derivatives of the solution. Estimates of derivatives. If we apply one of the operators
Dt, D2,. .. ,D, to (8.2.1) we obtain
i=l
i=l
+ CDkU + (Dkc)U 4- DkF, k
= t,
k = 2 , . .. , s. Introducing the vector
u = ( D ~ uD, ~ u ,... ,D,u) E R"", we can write this system as
where
B.=
-2
[: Bi
...
:i).
Using (8.2.1) again and observing the nonsingularity of B I = A, we can express Dlu in terms of 14, u, and F. Boundary conditions for g are obtained if we apply D t , Dz, . . . , D, to (8.2.3). Since we have already estimates for lu11* and for llu1$, we obtain estimates for 14 in terms of the data f, F, g and their first derivatives. Clearly, we also have an estimate for Dlu from (8.2.1). This process of estimating derivatives can be continued inductively.
287
Initial-Boundary Value Problems in Several Space Dimensions
8.2.2. Existence of a Solution To show the existence of a Cm-solution, we assume compatible data; for example, it is sufficient that the functions
m.t ) ,
fb),
go(y, t ) ,
91 (Y.t )
vanish identically in a neighborhood of all points (21
= O,y,t = 0) and
(21
= I , y , t = 0) where y = (2-2..
. . ,z,?).
We choose a gridlength h = 1/N, N a natural number. The space gridpoints are x, = ( h V l , . . . , hS), VJ E
z,
05
VI
5 N,
and we leave time continuous. The differential equation (8.2.1) is replaced by a system of ordinary differential equations for the gridfunction u(2-,, t) = uh(2-,, t) of the form (8.2.6) Here
&I
d dt
-U(X,,
t ) = Q ~ U ( Z , , t ) + F(z,. t).
15
VI
5 N - 1.
is the difference operator*
The coefficients are to be evaluated at (xu,t). The boundary conditions (8.2.3) are replaced by (8.2.8)
t J - ( O , y. t ) = SO(Y, t)a+(h,y, t )
+ 9O(lr, 0
7
u + ( l , ? / , t ) = Sl(y,t),u-(l - h,Y.t) + 9 l ( Y l t ) ,
where (0, y), (1 , y) are points of the spatial grid. There are no difficulties in discretizing the initial condition (8.2.2) by (8.2.9)
v(s,:O) = f(T,).
The differential equation (8.2.1) is discretized only at the interior gridpoints 1
2,,
5 V1 5 N
- 1,
of the strip. If we consider the equation (8.2.6) at a point x, = ( 1 1 , u ) close to the left boundary of the strip, say, then the difference operator
A-
(2,
,t ) D - I
*In the terminology of numerical analysis, we use "upwinding" to approximate a central difference formula in the periodic variables 1 2 , . . . ,zg.
AD,
and apply
288
Initial-Boundary Value Problems and the Navier-Stokes Equations
involves the value v-(O: y, t). We can use the discretized boundary condition (8.2.8) to eliminate this part of a U-value. Using periodicity with respect to the variables 22,. . . , z , ~we , have obtained a finite dimensional (linear) ordinary differential system for v ( t ) = v h ( t ) under initial conditions. Thus v”(t) is uniquely determined. As previously, by mimicking the estimates for the differential equation, one can bound all difference-differential quotients of vlL independently of h. Simple error formulae (in numerical analysis terminology, the consistency of the difference approximation) show that v h converges to a smooth solution U(Z,t) of the initial-boundary value problem for some sequence h -+ 0. Some of the details of the estimates of v h are provided in the next section. We summarize the result in
Theorem 8.2.2. Given the symmetric hyperbolic initial-boundary value problem (8.2.1)-(8.2.3) where B I = A is nonsingular and the matrices SO and SIare sufficiently small in norm. (For example, So = 0, S1 = 0.) If the data are compatible, there is a unique smooth solution. The problem is strongly well-posed.
+
The smallness-assumption for IS01 ISI I can be quantified as in the proof of Lemma 7.6.2. What we actually need is the estimate (8.2.5) for all functions which satisfy the boundary conditions.
8.2.3. The Finite Speed of Propagation We shall prove that the principle of finite speed of propagation is valid for the hyperbolic initial-boundary value problem (8.2.1)-(8.2.3). As in the case of the spatially periodic Cauchy problem (see Theorem 6.2.1), we construct a difference approximation whose solutions converge to the solution U(Z,t) of the continuous problem. For the discrete systems the speed of propagation will be finite and bounded independently of the step-size. The spatial meshsize h = 1 / N and the spatial gridpoints 2”
= (hv,,. . . , hv,),
vj
E
z,
05
VI
5N ,
are denoted as in the last section. We choose a time step k = hso;
SO
> 0 fixed,
where SO will be assumed sufficiently small, but independent of h. Discretizing in time and space, we determine a grid function u(z,,
t),
t = 0, k, 2k,. . . ,
Initial-Boundary Value Problems in Several Space Dimensions
289
by
t + k-)
~ ( z v ,
(8.2.10)
= (1
+ ~ Q+Ik-hQ2)u(zv, t ) + kF(zi,, t ) ,
l < ~ l < N - l ,
t=O.k.2k
,... .
Here Q I is defined in (8.2.7) and
c S
Q2
=
D+tD-t.
2=2
The gridfunction v is subject to the boundary and initial conditions (8.23). (8.2.9); as explained in the previous section, these conditions determine v uniquely. Clearly, the ratio h / k = sol bounds the speed of propagation in the discrete system (see Section 6.2); therefore, once we have proven convergence of d t ( z v t. ) to u(z. t ) as h + 0 (in the sense of (6.2.4) ), the number sil also bounds the propagation-speed for the continuous problem. It will be sufficient to show that we can bound u" uniformly in terms of the data. Then convergence follows, since vh - u satisfies the above difference equations with data which tend to zero for h --+ 0. To prove these bounds for v = vh, we introduce a discrete scalar product by
Also, we use the notation
where the sum extends over
05
..., us < N ,
~ 2 ,
and U I = j is fixed. In (vague) analogy to integration by parts with respect to rules:
X I ,we
have the
290
Initial-Boundary Value Problems and the Navier-Stokes Equations
where
Proof. Since summation over 0
5 ~2 , . . . , u s < N
applies to all terms, it suffices to prove the result for s = 1. Then we have (V,D-W)h
+ (D-v, W ) h - h(D-v, D-W)h
N-l
+
= ~ { ( u u , w u - w u - l ) (uu-uu-l,wu) u=
I
rL‘-
I
u=
( ~ u - - ~ u - l . ~ u - - u - I) }
I
= (u.v-1,wN-l) - (uo,-o).
(Here we have used the index notation v, for u(z,), etc.) This proves the first relation, and the second is shown similarly.
Recursive estimate for v = vh. The difference equation (8.2.10) gives us IIu(., t
+ 2 W v , Q 2 v ) h + 2k2 I I Q I ~ ~ I I ; ~ + 2k2h21 1 Q 2 ~ 1 1+~ { IC + k IIFII;,}.
+ k>IIi I IIvII;t + 2&v,
QIU)~
CI
112~112h
The inner products and norms on the right-hand side apply to the gridfunctions v( , t), etc., and we have used estimates like +
k2(Qiw, F)h I k2 IIQiulI,,
IlFll,,
I k 2 { k IIQi~II;, +
we apply Lemma 8.2.3 to treat the contribution of
1
IlFll;)
291
Initial-Boundary Value Problems in Several Space Dimensions
Since A- and A+ are bounded away from zero, we have, with some 6 > 0,
is small, we can obtain an estimate for the boundary terms
(v- , A- v- )r
I
N-l
0
+ (v+,A+v+)r 1 ,
N
in terms of the boundary data 90 and 91. Therefore,
+ I I D + I ~ + I I ? ~+}cqk{ IIvII; + IIgIIi,r}. The difference operator Q2 acts only in the periodic directions 2 2 , . .. , 2,; thus 2k(v,Qiv)h I -kh6{ IID-1v-112h
summation by parts gives us S
2khtv, Q z v ) ~= -2kh
C llD+tvII;. i=2
Finally, it is not difficult to show that
292
Initial-Boundary Value Problems and the Navier-Stokes Equations
Here q k 2 = qkhso. If so is chosen so small that
5
~ 5 . ~ 0min(6,
l},
then we have the recursive estimate
114.l
t
+ k)112h 5 (1 + kc) Ibll’h+ kc{ll.9l/’h,, + lF112h).
In any finite time interval we obtain the desired estimate of data. Thus we have proven
ZI
in terms of the
Theorem 8.2.4. Under the assumptions of Theorem 8.2.2 the principle of finite speed of propagation is valid for the symmetric hyperbolic initial-boundary value problem (8.2.1)-(8.2.3). 8.2.4. The Strip Problem vs. the Half-Space and Periodic Cauchy Problems Thus far we have treated symmetric hyperbolic systems (8.2.1): a) under the side-condition of spatial periodicity; b) in a strip 0 5 z~ 5 1 with boundary conditions at X I = 0, X I = 1 and periodicity assumptions with respect to x2,... x,. Only in the latter case did we need that B1 is nonsingular. In this section we will show how to use the strip problem to solve the hyperbolic system (8.2.1) in the half-space O 5 X 1 < c c l
-cc
< X Z , . . . ~ X<~ cc for t 2 0
with boundary conditions at X I = 0. Conversely, the strip problem can be reduced to left half-space, right half-space and periodic Cauchy problems. Essentially these results follow quite easily from the finite speed of propagation. The reduction of the strip problem to half-space and periodic Cauchy problems will be useful in the next section, where we remove the assumption that B I is nonsingular. Solution of halfspace problems. Suppose the coefficients and data in (8.2.1), (8.2.2) are defined for all z E RS,are I-periodic with respect to x2,.. .,zs, and are uniformly smooth. Furthermore, assume that the data f(z)and F ( x ,t) have compact support with respect to 2 1 ; i.e., there is a constant M with (8.2.1 1)
Jf(x)l
+ IF(z,t)J= 0
for lz11> M.
We always assume symmetry Bi = B f , and also require in this section that B1 is nonsingular. Our first result is
293
Initial-Boundary Value Problems in Several Space Dimensions
Theorem 8.2.5. lem
Under the above assumptions, consider the half-space prob-
c S
ut =
&(x, t)Dzu + C ( X , t)u + F ( x ,t ) =: Pu + F ( z ,t )
a= I
in 0 I X I < 00,
-00
< 2 2 , . .., x, < 00, t 2 0, with the initial condition u(x,O)= f(x>
and the boundary condition at x1 = 0, u-(O, Y, t>= SO(Yl t)'lL+(O,
Y,t ) + go(9, t ) .
Assume the data are compatible and IS01 is sufficiently small. There is a unique smooth solution which vanishes for 0 I t I T ifthe argument X I 2 c ( T ) is sufficiently large.
Proof. We fix a time T > 0 and consider the above problem in the strip 05
21
5 (YM,
cr
> 1,
with the additional boundary condition
'1L+(QM,Y, t ) = 0 at X I = ( Y M . According to Section 8.2.2, there is a unique smooth solution u(x,t) of this strip problem. The finite speed of propagation implies that u is identically zero in a neighborhood of the points (51
= a M , Y,t ) ,
0 It
IT,
if (Y is chosen sufficiently large. Setting u = 0 for X I 2 ( Y M , 0 5 t 5 T, we have solved the half-space problem for 0 5 t 5 T. Uniqueness follows as previously by an energy estimate. Also, the solution constructed in 0 I t I T does not change if we choose another TI > T .
Solution of strip problems. Consider the strip problem (8.2.1)-(8.2.3) and assume, as we did previously, that the coefficients and data are defined for all x. We want to show that we can express the solution of the strip problem as = u ( I ) + u(2) + u(3,
where u(I)and u(')solve left and right half-space problems, respectively, whereas d3)solves a periodic Cauchy problem. Such a representation is valid in a sufficiently small time interval
294
Initial-Boundary Value Problems and the Navier-Stokes Equations
OIt16; after time 6 one can restart the process. We choose a number* 0 < 7 1/2 and a monotone function
<
41 = 4I(ZI),
41 E C",
with
and define
To be precise, the last problem is not periodic in 21 originally. However, using the assumption (8.2.11), we can alter the coefficients and data outside a sufficiently large interval
-CYM I 21 5 O M and make them periodic. The finite speed of propagation ensures that we do not change d3)in 0<X1
T
OIt<6,
will be useful in the next section.
295
Initial-Boundary Value Problems in Several Space Dimensions
where 6 > 0 is sufficiently small. Clearly, the sum
u = ?!(I)
+ u(*)+ u(3),
05
%I
5 1,
05 t 5 6 ,
solves the given strip problem. The function u is nothing but the Cm-solution of the strip problem which we obtained already in Section 8.2.2. We have just described another representation. Using the values u(.,6) as starting data at t = 6, it is clear that there are no compatibility problems if we continue this process. This shows
Theorem 8.2.6. The solution u ( z ,t ) of the strip problem (8.2.1)-(8.2.3) can be obtained by solving half-space and periodic Cauchy problems in successive time intervals
to 5 t 5 to + 6. The time 6 > 0 depends on the finite speed of propagation. 8.2.5.
Cases Where Bl(z,t ) Becomes Singular
For the strip problem (8.2.1H8.2.3) we want to remove the assumption that Bl(rc,t) is nonsingular for all arguments. This is particularly easy if BI becomes < 1. For any fixed finite time T, there is singular only in the interior 0 < a number 0 < T 5 1/2 such that
B ; ’ ( z , t ) exists for 0 5 21 5
T,
1 - T 5 z1 5 1,
0 I t 5 T.
Then we split the strip problem into two half-space problems and a Cauchy problem as described in the last section. For definiteness, consider the right half-space problem. We change the coefficient Bl(z,t) to
+
Bl(Tt>= 41(z1/4)B1(z1t) ( 1 - 41(~1/4))B1(0,Y,t), z = (21, Y).
For 0 5 21 5 T it holds that BI = B I ; furthermore, it is not difficult to check that B, is nonsingular throughout if T > 0 is sufficiently small. Thus the changed right half-space problem (with B1) has a solution iI(’). In some small time interval the function GC1)is zero for z I > T , thus 6(’)= u(l)solves the unchanged right half-space problem. Similar consic!erations apply to the left half-space problem. For the periodic Cauchy problem it was not importaat that the coefficient B1 can become singular. Adding the three solutions, we obtain a smooth solution = u(I) +
+ u(3)
296
Initial-Boundary Value Problems and the Navier-Stokes Equations
of the strip problem in a small time interval 0 5 t 5 6. We take the constructed function u(.,6)as initial data at t = 6; in this way, no compatibility problems arise when we restart the process at t = 6. As the proof of Lemma 8.2.1 showed, the basic energy estimate is valid also for singular B I ;hence uniqueness of the solution is ensured. We have The result of Theorem 8.2.2 remains valid if B1 becomes Theorem 8.2.7. singular in the interior 0 < X I < 1 of the strip.
Cases where B I is singular on the boundary. For simplicity we restrict ourselves to right half-space problems (thus 21 > 0) and consider coefficient matrices B I = B l ( x ,t ) of the following three forms. Case 1. BI = where A- 5 -?I,
[
x]
A-(x, t ) 0 0 xf’Ao(x,t) 0 0 A+(x,t )
A+
> yI,
y > 0, and
A0
,
p
> 0,
is nonsingular.
Case 2. BI = where A- 5 - y I , A+
> yI,
y >O.
Case 3.
where A+ 2 y I , y > 0. Here A _ , Ao, A+ are always real diagonal matrices. In Case 3, the matrices
BI (0,Y: t ) have no negative eigenvalues and (in contrast to Case 1) the matrix A0 is allowed to become singular. The above representations are required for 0 5 z1 5 T , i.e., in some neighborhood of the boundary ZI= 0. The differential equation (8.2.1) is supplemented by an initial condition (8.2.2) and a left boundary condition.
Initial-Boundary Value Problems in Several Space Dimensions
297
u-(O, Y,t ) = S(Y,t)u+(O:Yr t ) + d Y 1 t).
In Case 3 no boundary condition is required. We want to show
t ) is singular on the boundary X I = 0 Theorem 8.2.8. Assume that Bl(x, and has either of the three forms described above. If IS1 is sufficiently small, the right half-space problem has a unique smooth solution. Proof. There are no problems in obtaining the basic energy estimate through integration by parts; compare the proof of Lemma 8.2.1. The boundary term of the left side of (8.2.4) is here
1
Ilu*(.
, 011; 4.
0
Also, if we want to estimate first derivatives, we apply the operators
Dt, D2,...
1
Ds
to the differential equation and the boundary conditions. In the resulting system we have to express (8.2.12)
( D ~ B I ) D I U , k = t,
k = 2 , . ..,s ,
in terms of Dtu, D ~ u ,. . , D,u using the differential equation (8.2.1). In Case 1 we have, for 0 < 21 5 T ,
Observing that
(DkBl)BFI,
k = t,
k = 2 , . .. , s ,
remains bounded for 21 + 0, no difficulties arise. In Case 2 the situation is even easier, since the “dangerous” part of the terms (8.2.12) vanishes identically near 21 = 0. In Case 3 we do not need any boundary conditions. Thus we apply all the operators
Dt,Di,Dz,...,D.~
298
Initial-Boundary Value Problems and the Navier-Stokes Equations
to the differential equation (8.2.1) and obtain the a priori estimates for first derivatives. This process can be continued, and one obtains bounds for all the derivatives
0:’D2y .. .D?u in Case 1 and 2; in the third case all derivatives can be estimated. We shall now estimate the sl-derivatives in the first two cases. To this end, we write the differential equation in the partitioned form
Using the differential equation, we can estimate D I U - ,Dlu+ and their y, tderivatives. Therefore we obtain, for w = D I U O ,
For H and its y, t-derivatives we have already established a bound. The matrices Bj” are symmetric and Bf2(Oly,t) = 0 by assumption. Therefore, we can estimate vo and all its yl t-derivatives. Then we can obtain bounds for Dfu-, D:u+ and the y, t-derivatives of these functions. In turn, this gives us estimates for Dfuo. This process can be continued. To show existence of a solution, we replace BI by B1 +al, o > 0. If o > 0 is sufficiently small, there exists a solution depending on (T.The estimates are independent of o,and the desired result follows by a limit argument. All these considerations apply to a small neighborhood near 21 = 0. With the splitting technique of Section 8.2.4 we obtain the result for the general case. 8.2.6. Results for More General Domains
For simplicity we restrict ourselves to two space dimensions and consider a bounded domain R c R2 with a smooth boundary curve r. Suppose we are given a symmetric hyperbolic system ~t
+
+ + F.
= B I U , B2uY CU
Along the boundary, we can write the differential equation in the form
where d / b n and d/ds denote the derivatives in the inward normal and tangential directions, respectively. Here
299
Initial-Boundary Value Problems in Several Space Dimensions
0 FIGURE 8.2.1.
Domain R with boundary
r
B, = BIcosa + B 2 s i n ~ , where Q denotes the angle between the x-axis and the inward normal to the boundary. We want to prove
Theorem 8.2.9. Assume that B, is nowhere singular on r and has exactly r negative eigenvalues. Suppose further that the boundary conditions consist of r linear relations Lu = g ,
rank L = r,
at each boundary point. The matrix L and the function g may vary smoothly along r. If at each boundary point we have an estimate
(8.2.13) with b > 0, c
( u ,B,u) 2 6 luI2 - c ILuI2,
> 0, then the problem is well-posed.
u E R",
300
Initial-Boundary Value Problems and the Navier-Stokes Equations
Here we have used the pointwise assumption (8.2.13) to treat the boundary integral. The basic estimate follows if we integrate with respect to t. To show the existence of a solution, we reduce the given problem to Cauchy problems and half-plane problems. To this end, let { 4 j } denote a (finite) partition of unity and let R j denote the support of 4j. We split the data functions f = fb,Y), F = F ( z ,y, t ) , g = g(z, Y, t ) into fj
= 4jf,
F' = +jF,
gj = 4 j g .
FIGURE 8.2.2. Partition of unity and transformation
If the support R j of 4j lies in the interior of R then g j = 0, and we solve the Cauchy problem with the data fj, Fj ignoring the boundary conditions. For a sufficiently small time interval, the solution fulfills the homogeneous boundary conditions automatically. If R j contains a part of the boundary r, then we transform a neighborhood of R j in such a way that the local piece of r is transformed into a piece of the new 5-axis and the normal directions are transformed to directions parallel to the Z-axis.
The new problem can be extended to a half-plane problem of the type discussed earlier. Transforming back and adding the solutions, we have solved the problem in a small time interval. Thereafter, we can restart the process. 8.2.7.
An Example in Two Dimensions
Consider the system u t = ( l0
- '1 ) u . + ( ;
~)u,+F
Initial-Boundary Value Problems in Several Space Dimensions
301
in the half-plane o
-oo
under our usual periodicity assumption with respect to y. The general theory suggests imposing one boundary condition at x = 0 which expresses u- in terms of u+. We consider a condition of the general form*
with smooth functions a and g. To obtain an energy estimate, we proceed as before:
=
]
[-v2(0,y, t )
+ W2(O, y, t ) ]d y + 2(u, F ) .
0
Now we replace w using the boundary condition. It is apparent that the desired estimate can be obtained as long as the boundary coefficient a ( y ) satisfies
for all y. This quantifies our previous assumption of “smallness” of the coefficient matrices in the boundary condition. (Compare Lemma 8.2.1, for example.) Now suppose that la(y)l
5 1 for all y,
a ( y 0 ) = 1 for some yo.
Then our estimate breaks down since the above boundary integrand is -IJ2
+ w2 = -v2 + (ov+ 9 )2 = (- 1
+ a2)v2 + 2avg + g2
= 2vg
+ g2 at y = yo
*We could also treat the case a = a(y,t ) .
302
Initial-Boundary Value Problems and the Navier-Stokes Equations
We still can derive a basic energy estimate if we first transform to homogeneous boundary conditions: Let
The differential equation becomes Ct=(l
o ) 4 x + ( l0 1, ) i i g + F ,
0 -1 E=F+e-" and the boundary condition reads
a), y, t ) = d y ) m , y, t).
(8.2.14)
Proceeding as before, the boundary term becomes
]
[-fi2(0,Y,t )
+ G2(0,y, t)]dy I 0,
0
and thus we can estimate l/iill. In this way we do not obtain a bound for 4 on the boundary z = 0, however. Difficulties arise if we want to estimate derivatives. To obtain boundary conditions for ii,, for example, we differentiate (8.2.14) with respect to y:
6,= a6,
+ a,6
at z = 0.
The equation has the inhomogeneous term a y G . The difficulties are avoided if we first make a unitary transformation of the dependent variable such that the boundary conditions have constant coefficients.
8.3. The Linearized Compressible Euler Equations We linearize the inviscid compressible N-S equations at a constant state
U , V , W, R,
P = r(R),
with dr c2 := -(R) dP
> 0, c > 0.
As discussed in Section 2.4.2, we obtain the strongly hyperbolic system
303
Initial-Boundary Value Problems in Several Space Dimensions
U
0
0
c?/R
R O O
v o o
0
U
O R 0
(If the ambient flow U = U ( x , t ) ,etc. is not constant, the linearized equations read as above after neglection of zero-order terms and forcing functions. Compare Section 6.4.) The above system can be symmetrized by introduction of the scaled density 6 = cp/R; one obtains the symmetric hyperbolic system
yi:i- L at
w
- P * - + B 2 - +dB 3 d } dy dz
[i), U
We want to discuss this symmetric system in the half-space
under the usual periodicity requirement with respect to y and z, and we want to derive boundary conditions at z = 0 which lead to a well-posed problem. (The matrix B1 is not diagonal; however, after a simple transformation the results of Section 8.2 apply.) The eigenvalues of B I are
Following the general theory, we will specify as many boundary conditions at = 0 as there are negative eigenvalues of el. Accordingly, we distinguish a number of different cases.
x
304
Initial-Boundary Value Problems and the Navier-Stokes Equations
Case I . U < 0 (outjlow of the ambientflow). In the supersonic or transonic case IUJ 2 c, the matrix B I has no negative eigenvalue and no boundary condition needs to be specified. In the subsonic case IUI < c, there is exactly one negative eigenvalue, ~4 = -U - c. Thus one boundary condition has to be specified. (This is necessary but not sufficient for well-posedness.) In order to obtain an energy estimate, we consider, as above, the expression
and use integration by parts with respect to x,y, and z. Assuming functions which vanish at z = +oo, the critical boundary term to be estimated is
where the index To indicates integration over y and z at the boundary x = 0. We try to obtain an estimate analogous to (8.2.5) and specify a boundary condition p=au+go
at z = O ,
for example. The boundary term (8.3.1) becomes
{ U ( V 2 + w2 + p 2 ) + (U + 2c(u)u2 + 2cugo}r". Since U < 0, it suffices to require that
u + 2ca < 0. This can be viewed as a requirement for the coefficient a in the boundary condition. With such a boundary condition the desired energy estimate is obtained, including an estimate of
on the boundary x = 0. We can also require that (8.3.2)
u=O
at x = O ,
or we can derive sufficient conditions for more general boundary conditions
li = all. + pv + yul +go. Once the basic energy estimate can be obtained with boundary conditions of the above form, we can also bound all derivatives of the solution up to the boundary. (Note that in the homogeneous case (8.3.2), the coefficient in the boundary condition is constant.)
Initial-Boundary Value Problems in Several Space Dimensions
Case 2.
305
U > 0 (inflow of the ambientflow). In the supersonic case
u>c>o, the matrix B I has four negative eigenvalues, and consequently all four variables u , u , w,D need to be specified. The boundary term (8.3.1) being given, there are no difficulties in obtaining the desired estimates. In the subsonic case
c>u>o, there are three negative eigenvalues, and one eigenvalue is positive. We specify three conditions, for example: w=g2,
t1=g1,
Substituting the expression for can be obtained if
p
p=cru+go.
into (8.3.1), we see that an energy estimate
U ( 1 + (22)
+
2CQ
< 0.
A possible choice is a = - 1. In the transonic case
c=u>o. the matrix B I has three negative eigenvalues, and the eigenvalue zero. As before, we need three boundary conditions to obtain an energy estimate. If the state
U , V, W , R,
P = r(R),
at which we linearize is constant, then the conditions of Theorem 8.2.8 are automatically fulfilled, and we obtain a well-posed problem. (After diagonalizing B1, we have Case 2 of the theorem.) If the state is not constant, we need conditions as required in Case 1 or 3 of Theorem 8.2.8.
U = 0 (a wall). In this case B I is singular and has exactly one negative eigenvalue; hence we have to specify one boundary condition. For example, if the boundary condition takes the form Case 3.
at z = O ,
fi=au+go
then the integrand in (8.3.1) becomes 2CQU2
and we obtain an energy estimate if (8.3.3)
u=O
Q
+ 2cug0, < 0. Also, we can use the conditions at
z=O,
306
Initial-Boundary Value Problems and the Navier-Stokes Equations
or at z=O.
2,=0
(Note that 2, is a density correction; thus also the latter condition might be physically reasonable.) In all cases we obtain the basic energy estimate, i.e., an estimate for
I1
(') I?. P
If the conditions of Theorem 8.2.8 are not met, there are difficulties in estimating derivatives up to the boundary.
8.4. The Laplace Transform Method for Hyperbolic Systems Consider a strongly hyperbolic system
~t
= Au,
+ Buy + F ( z ,y, t),
u=
(
UI(X1
y, t)
i
U n ( X 1 y,
)
l
t)
in the half-space o
-0O
t>o,
under an initial condition at t = 0 and boundary conditions at x = 0. The energy method employed in Section 8.2 provides a tool to derive sufficient conditions for well-posedness, but if the energy method does not apply then one does not know whether or not the problem is well-posed. The technique described here can be used - in principle - to decide the question of well-posedness. Employing Fourier transformation in y (or Fourier expansion in the periodic case) and Laplace transformation in t , one obtains a family of ordinary boundary value problems on the half-line 0 5 z < 00, which can be discussed explicitly. In the case of one space dimension, we have proceeded in a similar way in Section 7.4; however, the presence of the dual variable w to the space variable y brings a new element into the discussion here. There are no difficulties in generalizing from two space dimensions to three dimensions or more. A generalization to variable coefficients A = A(z,y,t), etc. is more involved. Roughly speaking, it turns out that the frozen-coefficient principle is valid; i.e., if all frozen-coefficient problems are well-posed then the variable-coefficient problem is also well-posed. We will formulate a corresponding result without proof.
Initial-Boundary Value Problems in Several Space Dimensions
307
8.4.1. An Example To illustrate the general theory, we will discuss a specific example, namely the symmetric hyperbolic system
in the half-space
t20,
-00
O I X < 0 0 ,
with initial condition (8.4.2)
u(2,Y, 0 ) = f(z,Y).
At x = 0 we prescribe a boundary condition
(8.4.3)
ui(0, Y,t ) = au2(0,Y, t )
+ S(Y,0,
Y E R,
t
2 0,
where a E C is a given constant. In contrast to the previous section, we do not request periodicity in y here. Instead, u , f , 9, F , and all derivatives of these functions are assumed to lie in L2 for each t 2 0. Also, we assume the data to be compatible at t = 0, and require that F and g have compact support in O
Let F = 0, g = 0. Substitution of a function
(8.4.4)
with parameters
a>0,
SEC, W E R
into the differential equation (8.4.1) leads to (8.4.5a) =
(
-1
0 4AX)
+ iw ( 0 1o ) &z),
0
I 2 < 00.
If we add the boundary conditions (8.4.5b)
we have obtained a family of eigenvalue problems.
Definition 1. Let w E R be fixed. A number s E C is called an eigenvalue of (8.4.5) for the parameter w if there is a nontrivial solution 4 E C” of (8.4.5).
308
Initial-Boundary Value Problems and the Navier-Stokes Equations
It is not difficult to show
Lemma 8.4.1. Iffor some wo E R there is an eigenvalue SO E C with Re SO > 0, then the initial-boundary value problem is ill-posed in any sense. Proof. The parameter a > 0 in (8.4.4) can be chosen arbitrarily large, and consequently there is no bound on the rate of exponential growth in time. (Formally, the function u given in (8.4.4) is not a solution since u(x,. , t ) $! L z . However, we can multiply on the Fourier transform side by a function $(w) having a peak at wo and integrate w.r.t w. See the proof of Theorem 2.2.2.)
Discussion of the eigenvalue condition. The previous lemma naturally leads to the following question: What is the requirement on the parameter a E C appearing in the boundary condition such that there is no eigenvalue s E C with Res > O? This requirement on a is necessary for well-posedness, as follows from the previous lemma. An explicit discussion shows
Lemma 8.4.2.
The following conditions are equivalent:
(i) The number a E C satisfies aE
(ii) For all w E
R or la1 5
1.
R,all eigenvalues s E C of (8.4.5) satisfy Re s 5 0.
Proof. Equation (8.4.5a) is equivalent to
If R e s
> 0 then the above matrix has the two eigenvalues
with Re K ] The eigenvector to
K~
< 0 < Re K 2 .
reads
and therefore the general L2-solution of (8.4.5~) is given by
309
Initial-Boundary Value Problems in Several Space Dimensions
The boundary condition at z = 0 requires that o(s
+ JiG-2)= o a i w ,
and consequently the number s E C, Re s
> 0, is an eigenvalue to the parameter
w if and only if (8.4.6)
s
+- J2T-7 = aiw.
For w = 0, equation (8.4.6) has no solution s with R e s dividing (8.4.6) by IwI, we obtain: W
z + J ~ = a i - - , Iw I
z=-
S
IwI ’
> 0.
Thus let w
# 0;
Rez.>O.
The function
$(z) = t
+ dt2+ 1,
Rez
2 0,
maps the line Re t = 0 onto the boundary of the domain R in Figure 8.4.1, and Rez > 0 is mapped onto
R = { $ E C : Re$>O
and
Therefore the equation
.w
$ ( z ) = az-
IWI
has no solution z with Re z
> 0 if and only if f i a @ 0,
i.e., a E R or la] 5 1.
FIGURE 8.4.1. Image of $ ( z ) , Re i 2 0
]$I>
1).
310
Initial-Boundary Value Problems and the Navier-Stokes Equations
8.4.2. Example Continued: Formal Solution If there is no eigenvalue s E C with R e s > 0, then we can solve the problem formally. (This means, the algebraic equations and ordinary boundary value problems that appear below can be solved, but the question of convergence of integrals requires further study. As a rule, if the data are sufficiently "wellbehaved", a formal solution is a genuine Cm-solution. However, the problem is well-posed only if one can derive the proper estimates of the solution in terms of the data.) To illustrate this, we consider (8.4.1H8.4.3)with f = 0, F = 0 and first apply Fourier transformation in y. Thus we write
and obtain:
Q(z,w, 0) = 0,
+
Q,(O,w,t ) = &(O,
w ,t ) j(w, t ) .
Thus, for any fixed w,we have to solve an initial-boundary value problem in one space dimension 0 5 z < 00. Denoting the Laplace transforms in t by u ( z ,w ,s ) =
r1
e - s t Q ( z ,w,t )d t ,
00
h ( w ,s) =
e-"tj(w, t) d t ,
Re s > 0,
the equations transform to
VI(0,
w,s ) = avz(0.w,s )
+ h(w,s),
and the requirement
1
03
IV(?
w, S>l2d z
< O0
is naturally added as a boundary condition at z = u ( z , w, s ) can be solved for each pair
00.
The equations for
311
Initial-Boundary Value Problems in Several Space Dimensions
( w , ~ )w, E R, Res > 0. separately. Using the eigenvalue- and eigenvector-results of the proof of Lemma 8.4.2, we find
Here
(T
= g(uls) is determined by the boundary condition at .r = 0, u(s
+ Js2 + w2) = uaiw + h(U,s).
By assumption, there is no eigenvalue s with Res solve for (T,
hGJ1s)
(T=
s
. + Jm - aiw
> 0, and
Res
therefore we can
> 0.
Thus we can compute the function o(slw’,R ) , and if there are no convergence problems, we can transform back and obtain the solution u(s,y, t ) of the initialboundary value problem.
8.4.3. Example Continued: Estimate of the Solution on the Boundary To investigate well-posedness, we try to estimate the solution in terms of the data. The most critical question is, as it turns out, whether one can estimate the solution on the boundary 2 = 0. To study this question, consider the example (8.4.1)-(8.4.3) with f = 0 and assume that (8.4.7)
aER
or
la1 5 1.
Thus there is no eigenvalue s with Res > 0, and we can solve the problem formally. Using the notations of Section 8.4.2, we have that (u(olU,s)12 = 1(T12{1s- K I l 2 + L J 2 }
Let us denote the factor multiplying Ih(w. s)12 by p2(w.s); thus, for w’ # 0,
and p2(0.s) = 1 for w = 0. Re s cases:
> 0. There are two fundamentally different
312 Case 1.
Initial-Boundary Value Problems and the Navier-Stokes Equations
There is a constant q, with p2(w,s) 5 q, for all w E R, Re s > 0.
The function p2(w,s) is not bounded in the domain w E R, Re s > 0. For the example under consideration, it is not difficult to show that Case 1 prevails if and only if la1 < 1, and therefore Case 2 prevails if and only if Case 2.
(a1 = 1
or
(u E
R and la1 > 1).
(Recall the assumption (8.4.7).) Concerning the question of well-posedness, the two cases of behaviour of p2(w:s) - bounded or unbounded - lead to different answers. Only in the first case can one derive estimates of the solution on the boundary which express strong well-posedness in the generalized sense. (We will prove even more below, namely strong well-posedness in the usual sense.) In Case 2 such estimates are not possible, and the problem is not strongly wellposed in the generalized sense. Nevertheless, the explicit solution formula can be used in Case 2 also, and one can derive weaker estimates. We concentrate here on Case 1 and prove
Lemma 8.4.3. Suppose that p2@, s) 5 q, for all w E R and all s E C with Res > 0. Then, for each time T , there is a constant K' independent of the boundary data g with
The constants KT can be chosen uniformly for 0 5 T 5 To; i.e., h-T = K(T0). In the above formula
denotes the L2-norm of the boundary data at time t , and similarly Ilu(0, .. t)llr is the L2-norm of the solution on the boundary x = 0 at time t.
Proof. First we recall the relation u(O?w,s) =
J,
eCatG(O, w ,t )d t ,
Re s
> 0,
between G and its Laplace transform u. For fixed w E R and 77 > 0 we apply (7.4.9) and find that
313
Initial-Boundary Value Problems in Several Space Dimensions
The second estimate clearly follows from our assumption that p 2 ( d . s ) 5 Since h ( w , .) is the Laplace transform of G(w, .), equation (7.4.8) yields
CQ.
The resulting inequality
is integrated w.r.t. w. After interchanging the order of integration, an application of Parseval’s relation yields
By an argument as given in the proof of Lemma 7.4.6, we can change the data t > T without affecting the solution U ( F , y: t ) for t 5 T , and the result follows.
g(y. t ) for
8.4.4.
Example Continued: Strong Well-Posedness in the Generalized Sense
We consider now the inhomogeneous equation
with homogeneous initial data u(s,y, 0) = 0 and the same boundary condition as before, UI(0,
Y. t ) = alL2(O.y1 t ) + .dy,t ) .
After Fourier and Laplace transformation, we obtain: (8.4.9) su = Au,, iwBzj+ H ( z , w . s).
+
zq(0. w ,S) = avz(0, w,s)
+ h(w,s).
112.1(., U/‘,
s=i<+q. s)ll
q>o.
< 00.
We assume that there is no eigenvalue s with Res > 0. Then, for every fixed s, w,the ordinary boundary value problem (8.4.9) for u(..w ,s) can be solved, and we obtain a formal solution of the given initial-boundary value problem by
314
Initial-Boundary Value Problems and the Navier-Stokes Equations
inverting the Laplace and Fourier transform. The formal solution is a genuine solution if one can derive sufficiently strong estimates. To derive estimates, we take the scalar product of (8.4.9) with v , integrate over 0 I 2 < 00 and consider the real part:
+ Re iw (v,Bv)+ Re ( v , H )
Re s(v,v ) = Re (v,Av,) (8.4.10)
1 2
= -- (v(0,w ,s ) , Av(0, w.s))
First, assume that la1
+ Re ( v , H).
< 1. Using the boundary condition for v , we obtain that
1 2
-- ( ~ ( 0W, , s), Av(0.w.s ) ) =
1 2
- (lvI(0. W , s)12- Iv2(0.W , 5)l2) 1
I -4
1
I -8
(1 -) ’1.1
Ivz(0, w,S)l2
(1 - la12)1v(0!W,
S)l2
+ KO l h ( W , S)l2
+ KI Ih(w,
S)l2.
Therefore, (8.4.10) yields that 1
(8.4.11)
2 Ilv(.. W , s)l12+ - ( 1 - IUI’) 2 8
Iv(0, w.S)1*
1 u, s)1I2 K l Ih(w,s)I2. 11 = Re s. 271 Here K I is independent of w ,s, h , and H. By Parseval’s relation, we obtain estimates of u in terms of the data F and g; see Section 7.4, in particular (7.4.1 1). The estimates imply that the given problem is strongly well-posed in the generalized sense. The formal solution is indeed a genuine solution. Second, assume that la1 = 1 and g = 0. In this case
5
+
-
1 2 and we obtain, instead of (8.4.1 l),
- - ( ~ ( 0LJ., s), Atl(0,W . s ) )
11
IIu(..w,
I
0,
1
4112I - IlH(..iJlS)1l2. rl
Thus the problem is weakly well-posed (see Definition 4 in Section 7.3); we do not obtain an estimate of the solution u on the boundary s = 0. Let us summarize the results for the example. The method of Laplace transformation shows that the condition la1 < 1 is necessary and sufficient for strong well-posedness in the generalized sense. In Section 8.2.7 we have treated the example already by the energy method, and could derive energy estimates un-
315
Initial-Boundary Value Problems in Several Space Dimensions
der the same condition, namely la1 < 1. This might be misleading, because the method of Laplace transformation has generally a wider range of applicability. We have seen this already in the parabolic case. For hyperbolic systems, the energy method requires symmetric hyperbolicity, whereas the Laplace transform method can be applied to strictly hyperbolic systems, too. On the other hand, an application of the energy method is preferred, whenever possible, since intricate algebraic discussions are usually avoided.
Generalizations
8.4.5.
Consider a strongly hyperbolic initial-boundary value problem (8.4.12) ult = A u , + B u y +F(~,y,t), 05x
u(z1 Y,0 ) = f b ,y),
< 03,
y E R, t 2 0:
0Ix<00, YER,
~ ' ( 0y,,t ) = Ru"(0, y, t )
+ g(y, t ) ,
y E R.
f
L 0.
Here A , B, and R are constant matrices and
A=
("' 0
O )
A2
' A I = diag(A1, ... ,A,),
x , < o ,..., x,.
A,+1>0
A2 = diag(X,+I
,... . A d ,
,... ,A,,>O.
The unknown vector-function u is partitioned accordingly,
u=
(:I:)
, u' of length r.
If f = 0, then we apply Fourier transformation in y, Laplace transformation in t, and obtain, with the same notations as before, (8.4.13)
sv = Av, + i w B v + H(x,w,s). 0 5 x < 00, w E R, Res > 0, v'(0, w ,s ) = Rv"(0, w,s )
+ h(w,s),
Ilv(., w ,s)ll < m.
The eigenvalue condition. Suppose that for some w E R and some s E C with R e s > 0 there is a nontrivial solution 4(x)of s4(x) = A4,(x)
+ iiJB4(z),
316
Initial-Boundary Value Problems and the Navier-Stokes Equations
Then the problem (8.4.12) is ill-posed, because the functions
are solutions for F = 0, g = 0, and hence there is no bound on the exponential growth rate in time. To discuss the above eigenvalue condition, we note that the general solution of
can be written in the form (8.4.14)
4(z) =
C
cj~j(z)exp(n;z),
uj
E C.
Re nj < O
Here
~j = K ; ( w ,
(8.4.15)
s ) are the roots of
(
det A - l ( s I - i w B ) - K I ) = 0
and @;(z) = @j(z,w,s ) are the corresponding vector-functions; these are polynomials in 2 of degree 5 m; - 1 where m; is the algebraic multiplicity of ~ j For a further discussion, the result of the next lemma is important. Recall first the assumption of hyperbolicity, which implies that all matrices
iwlA
+ iw2Bl
wl,w2 E R,
have only purely imaginary eigenvalues.
Lemma 8.4.4. Let w E R and s E C with Re s > 0 be given. The characteristic equation (8.4.15) has exactly r roots K; with negative real parts and exactly n - r roots with positive real parts. (The roots are counted according to their algebraic multiplicig.)
Proof. There is no purely imaginary root
KI
= iwl since otherwise
0 = d e t ( s l - i w B - i w l A ) , R e s > 0, in contradiction to the hyperbolicity assumption. Now fix w and let
The roots ,u; of
iw A - ' ( l - -B) -PI) S
K
= 0, ,u = S 1
.
317
Initial-Boundary Value Problems in Several Space Dimensions
are
. n. Hence the assertion follows, since the t c j depend continuously on s, and no can cross the imaginary axis for Re s > 0. According to the lemma, the sum in (8.4.14) consists of we obtain at z = 0 a representation of 4, $(O, w , s) = @(w, s ) r ,
with a matrix @ ( w , s ) of size n x boundary condition, we obtain
Lemma 8.4.5. if and only if the
T.
x
T
a'
crl
> 0 is an eigenvalue for a given w
matrix @'(w, s ) - R@."(w,
is singular. Here
E
terms. In particular,
Introducing this representation into the
A number s E C with Re s T
0
T
K~
consists of the first
T
and
s) @'I
of the last n - T rows of @.
Formal solution and estimates. Suppose there are no eigenvalues s with positive real parts; i.e., the matrices @' - R@." are all nonsingular. As in the example, we can solve (8.4.13) and obtain a formal solution of (8.4.12) (with f = 0) by inverting the Fourier-Laplace transform. To derive estimates, consider first the case F = 0, f = 0. We have H = 0 in (8.4.13), and therefore
v(0,w, s ) = @(w, s)a where
{@'(u, s) -
R@"(w, s ) } r = h(w, s).
One can derive an estimate
for 0 5 t 5 T , with (8.4.16)
h'T
independent of g, if and only if the function
l@(w,s){@'(u,s)-
R@''(w.s)}-'),
w E R, R e s > 0,
is bounded.
lnhomogeneous differential equations and the symmetrizer. Now consider the case with an inhomogeneous term F in the differential equation (8.4.12). As before, we assume that the function (8.4.16) is defined and bounded. The simple process of Section 8.4.4 for deriving estimates of u in terms of g and F
318
Initial-Boundary Value Problems and the Navier-Stokes Equations
does not work, in general. However, if the system (8.4.12) is strictly hyperbolic, one can construct a symmetrizer, which allows us to derive the estimates. Let us define W
S
s’=
Jv3
s1*
+w
w’=
J 7 l
512
+w
s=i<+v,
v>o.
Then (8.4.13) can be written as follows: 1
(8.4.17) s’u =
Au,
1
+ iw’Bu +
One can show
Lemma 8.4.6.
Suppose that (8.4.12) is strictly hyperbolic and the function (8.4.16) is defined and bounded. For everyfuced 7 > 0 there is a matrixfunction 3 = S(w’,<’) which is defined for the arguments - 1 5 w‘, <’ 5 1 and which has the following properties: 1 ) The function S(w‘, <’) is Cm-smooth. 2) For all arguments w‘, <‘the matrix S A is Hermitian. 3) If y E C”, h E C‘ are vectors with y’ = Ry” h, then
+
Here 61
> 0 and C are constants independent of y, h, w’, 77 > 0, it holds that
77
4) With a constant 62 independent of w‘, S(s’1- iw‘B)
> 0.
+ (s’1 - iw’B)*>* 2 S277’1,
77’ = R e d .
For a proof we refer the reader to Kreiss (1970). Let us assume here that the symmetrizer is constructed. Then one can derive estimates of the solution u = u ( x , w , s ) of (8.4.13) as follows: We multiply (8.4.17) with 3, take the inner product with u,and integrate over 0 5 z < 00. As a result we obtain (8.4.18)
Also, using integration by parts and the properties 2. and 3. of 2(u, SAv,) = (u, SAu)I
x=o
2 61Iv(0,w , s)I2
- Clh(w,s)I2.
Now we take the real part in (8.4.18), use property 4. of 2(lsI2 w ~ ) ’ / Then ~ . it follows that
+
61I ~ ~ O , W s)I2 , + 62~11u(*,w, s)1I2
3, we find that
9,and multiply with
I const llull IlHll + Clh(w,s>I2.
Initial-Boundary Value Problems in Several Space Dimensions
319
This gives us the desired estimate for the transformed function u. By Parseval's relation we obtain
Theorem 8.4.7. Suppose that the system ut = Au, + Bv, is strictly hyperbolic. Then the initial-boundary value problem (8.4.12) (with f = 0) is strongly well-posed in the generalized sense ifand only ifthe function (8.4.16) is defined and bounded. Remark. The functions Q J ( x )= @.,(x.w ,s) in (8.4.14), and consequently the matrix @(w,s), are not unique. However, if the are suitably normalized, then - for each fixed w - the matrix function @(w. s) can be extended continuously to Re s = 0 in such a way that rank @ ( w ,s) = T for all w' E R and all s E C with Re s 2 0. With such an extension, the expression (8.4.16) is defined and bounded if and only if the matrix (8.4.19)
@'(w. s) - R@"(w,
s)
is nonsingular for all w' and all Res 2 0. This observation is helpful for a discussion of the boundedness of (8.4.16). If a matrix (8.4.19) is singular at d o . SO = i(0, then so is called a generalized eigenvalue for d o . The corresponding roots
of (8.4.15) might be purely imaginary, and the corresponding nontrivial solution 4(x) is generally not in L2. The example (8.4.1), which we discussed in the previous sections of this chapter, is even strongly well-posed in the sense of Definition 1, Section 7.3, provided that In1 < 1. Thus, under the assumption that 10) < 1, we can also estimate the solution for inhomogeneous initial data. This has been shown already in Section 8.2.7 by a direct energy estimate. For the general case discussed here, one cannot show an energy estimate directly. Nevertheless, one can prove
Theorem 8.4.8. Suppose that the system ut = Au,. + Bii, is strictly hyperbolic. Ifthe initial-boundary value problem (8.4.12) is strongly well-posed in the generalized sense, then it is also strongly well-posed in the sense of Definition 1, Section 7.3. A proof of this result is contained in Rauch (1972 a,b, 1973). The arguments are rather involved.
320
Initial-Boundary Value Problems and the Navier-Stokes Equations
All results generalize to half-space problems in more than two space dimensions. We Fourier transform in all space variables tangential to the boundary z = 0, and obtain a dual variable w which is a vector instead of a scalar. The other considerations remain the same.
Variable coeflcients. Consider a strictly hyperbolic problem (8.4.12) with smoothly varying coefficients
A = A(x, y, t ) . B = B ( z , y ,t ) , R = R ( y , t ) . We assume A to be diagonal* for all arguments, and nonsingular at z = 0. The (constant) block-structure of A ( O , y , t ) with A' < 0. A" > 0, and the corresponding partitioning of u into u', U" are the same as in the case of constant coefficients. In particular, R = R(y, t) has constant size T x (n - T ) . For each boundary point (0,yo, t o ) we obtain a problem with frozen coefficients,
+
ut = A(O, YO, t ~ ) u z B(O,YO.
(8.4.20)
t0)U.y
+ F ( z ,Y,t ) .
4 x , y, 0 ) = 0; &,
y, t ) = m o , to)u"(O, y, t )
+ . 9 b , t).
For these problems we can decide the question of strong well-posedness by Theorems 8.4.7 and 8.4.8. For the variable-coefficient problem we state
Theorem 8.4.9. The variable-coefficient problem is strongly well-posed if the differential equation is strictly hyperbolic and all frozen-coefficient problems (8.4.20) are strongly well-posed. Using the theory of pseudodifferential operators (see, for example, Eskin (1973) or Nierenberg (1970)) and the symmetrizer 3, we want to outline the proof of strong well-posedness in the generalized sense. As before, the main problem is the estimate. Let y > 0 be fixed, and transform the differential equation to 2, = ( P -
We construct the symmetrizer 3 = .!?(z,y, t , d, s') pointwise: at each point (z, y, t) the properties I., 2., and 4. of Lemma 8.4.6 hold, and at each boundary point (z = O , y , t ) property 3. also holds. (One can construct .!? as a smooth function of all arguments.) The symmetrizer 3 is used as the symbol of a *If A is not diagonal, we apply a transformation 6 = S-Iu, S = S(r,y,t),such that S-IAS is diagonal. This introduces lower-order terms, but these do not influence well-posedness.
321
Initial-Boundary Value Problems in Several Space Dimensions
pseudodifferential operator S. For sufficiently large estimate from
61
1: IM.. /
lrxi llfi(.,
71
rxi
Y, t)llF
dt + 6277
we obtain the desired 30
.. t)1I2dt - C
30
5 2Re
(ii, S(fit - ( P - 7 I ) i i ) )d t
-m
1, 3j
= 2 Re
(ii,S p ) dt.
Here the data functions are set to zero for negative t. The above estimate yields strong well-posedness in the generalized sense. Again, the results Rauch (1972 a,b, 1973) show that the problem is even strongly well-posed in the sense of Definition I , Section 7.3. Str-icffy hyperbolic systems are not common in applications. For example, the linearized compressible Euler equations in 3D are not strictly hyperbolic. In Agranovich (1972) it is shown that the previous theorem remains valid for strongly hyperbolic systems if there is a transformation s(x. y, t , W I . w2)which is analytic in W I , w2 and smooth in z, y. t , and which diagonalizes the symbol
+ B(z,y,t)~2 ).
= ~(z.y,t,iwl,i~2) = i(A(x,y,t)wI
In other words, for all arguments we have
s-'Ps = idiag(A1 ... . . A,,),
A,
real.
A corresponding result holds for strongly hyperbolic half-space problems in any number of space dimensions. One can show that a transformation with the above properties exists for the linearized compressible Euler equations; therefore, the theory outlined above does apply. In Oliger and Sundstrom (1978) a rather complete discussion of boundary conditions for the Euler equations is given. The existence of the transformation 3 seems to be typical for hyperbolic systems which appear in applications. Let us note further that problems in more general domains (with smooth boundaries) can be reduced to half-space problems and pure Cauchy problems by partition of unity arguments and local transformations. For this reason the study of half-space problems is most important. The main restriction we made throughout Section 8.4 is the assumption of a nonchar-acteristicboundary. General results for a characteristic boundary are not known. However, Case 2 of Theorem 8.2.7 has been treated in Majda and Osher (1975) in the FourierLaplace transform framework.
322
Initial-Boundary Value Problems and the Navier-Stokes Equations
8.5. Remarks on Mixed Systems and Nonlinear Problems Mixed systems. As in the one-dimensional case, we can extend our results to mixed hyperbolic-parabolic systems. Initial-boundary value problems for parabolic systems were discussed in Section 8.1, for hyperbolic systems in Section 8.2. Now couple two such systems - in the same way as in the Cauchy problem - by adding lower-order terms. (See Section 6.3.1 or Theorem 2.5.1.) The initial-boundary value problem for the coupled system is well-posed with the same boundary conditions provided that the boundary is noncharacteristic for the hyperbolic part. If the boundary is characteristic and the conditions of Section 8.2.5 are met, then the problem is still well-posed if we use a Dirichlet condition for the parabolic part. Much more general boundary conditions can be discussed in the framework of Laplace-Fourier transforms. Here we refer to Strikwerda (1977). For the treatment of the N-S equations, one is also interested in the behavior of solutions near the boundary when the viscosity converges to zero. We refer to Gustafsson and Sundstrom (1978) and to Michelson (1988). Nonlinear problems. No new difficulties arise for short-time existence of solutions of quasilinear problems. Consider, for example, a half-plane problem for a quasilinear symmetric hyperbolic system of the form 111
{ A ( z ,Y, t )+ €AI(X.Y, t. u ) } u , + { N x .Y. t ) + EBI(Z.Y, t , u ) } u ,
=
+ a x .y. t)u + F ( z .y, t ) + EFl(T,y. t. u). O ~ x < O o .
-CQ<<<<.
t20,
with initial and boundary conditions U(T1
Y. 0 ) = f (.,
Y),
u'(0. Y, t ) = {So(?/, 0
+ E S I ( Y , t ,u ) } u ~ ' ( OY.: t ) + 9(Y, t ) + E91(?/. u.). tl
We assume that all coefficients and data are CX-smooth and that A, A , , B , B I are Hermitian. The matrix A(0,y. t) is assumed to be nonsingular and diagonal. The variables u = ( u ' , u " ) are partitioned according to the signs of the diagonal entries of this matrix; see Section 8.2.1. One can show a result of the following type:
Theorem.
Assume that the linear problem which is obtained for E = 0 is strongly well-posed. Then -for suficiently small E - the nonlinear problem has
Initial-Boundary Value Problems in Several Space Dimensions
323
a unique smooth solution in a time interval 0 5 t 5 T,. Here T, + 00 for E + 0. As in Section 5.3, one can also derive asymptotic expansions of the solution.
Clearly, nonlinear systems usually do not occur directly in the form described above. Nevertheless, local existence results can frequently be derived by a theorem of the above type. To illustrate the principle, we consider a quasilinear system Ut
+ F(x,t , u),
= P(x, t , u,a/ax)u
4 2 ,0)=
f (XI,
together with quasilinear boundary conditions. Now x can be a vector of any dimension. Then we solve the linear problem Wt
+ F(x,t , f ),
= P(x, t , f,a/ax)w
w(x, 0 ) = f( 2 ) ; i.e., we evaluate the nonlinear coefficients at the initial data. The same process applies to the boundary conditions for w.We substitute u = €6
+
Ul
into the original equations. For the new variables ii we obtain a system which has the above structure in a time interval of length 0 5 t 5 K E ;i.e., the nonlinear terms are multiplied by 6 . Results of the type sketched above are valid for parabolic, for hyperbolic, and for mixed hyperbolic-parabolic problems. The systems need not be symmetric. Estimates can be derived which yield strong well-posedness in the generalized sense. We refer to Strikwerda (1977) and to Michelson (1988).
Notes on Chapter 8 Energy estimates for initial-boundary value problems have a long history. Some references are Friedrichs (1958), Ladyzhenskaya (1984), and Lions (1961). For systems &/at = P ( d / d z ) u with constant coefficients, Hersch (1963) derived necessary and sufficient conditions for weak well-posedness of half-space problems. As in Section 8.5, after Fourier and Laplace transform, he obtained an eigenvalue problem. The half-space problem is weakly well-posed if and only if the eigenvalues s satisfy Re s 5 const. For a homogenous operator P ( a / d z ) this condition becomes: There are no eigenvalues s with Re s > 0. For parabolic systems the corresponding condition leads to weakly well-posed problems in the sense of Chapter 2, even for problems with variable coefficients.
324
Initial-Boundary Value Problems and the Navier-Stokes Equations
This was proved by Agranovich and Vishik ( 1 964), Eidelman (1 964), and Solonnikov (1965) using generalizations of Levy’s parametrix. For hyperbolic first-order systems with variable coefficients we required the stronger condition: there are no eigenvalues or generalized eigenvalues s with Re s 2 0. A first result in this direction is due to Agmon (1962). The general theory for first-order systems was developed by Kreiss (1970) with extensions by Ralston (1971), Rauch (1972a,b, 1973) and Agranovich (1971, 1972). For single higher-order equations the theory is due to Sakamoto (1970, 1982). There is no general theory for equations with variable coefficients which satisfy the weaker eigenvalue condition (Lopatinskii condition) pointwise. For more details we refer to Eskin (1983) and Volevich and Gindinkin (1980). For difference approximations a similar theory has been developed. See Kreiss (1968), Osher (1972), and Gustafsson, Kreiss, and Sundstrom (1972) for results in one dimension, and Michelson (1983, 1987) for results in more dimensions.
9
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
In the next two chapters we apply the general theory to the Navier-Stokes equations. For references and deeper insight we refer the reader to von Wahl (1983, Temam (1984, 1983), and Ladyzhenskaya (1969).
9.1. The Spatially Periodic Case in Two Dimensions Without further mentioning, all functions in this section are assumed to be real, Cm-smooth and 2.rr-periodicin 5 and y. We consider the viscous incompressible N-S equations (9.1.1) (9.1.2)
ut Vt
+ + vuy + p x = V A U+ F ( z , y, t ) , + + vuy + p , = VAV+ G(x,y, t). UU,
UV,
21,
v
> 0,
+ Vy = o>
and give initial conditions (9.1.3)
u(2,Y l 0)= f(GY),
4 2 , Y,
0 ) = d Z 1 Y).
Clearly, consistency of (9.1.2) and (9.1.3) requires us to assume that (9.I .4)
fJ;
+ Qy
= 0.
325
326
Initial-Boundary Value Problems and the Navier-Stokes Equations
Notations. We define an inner product and a norm for scalar functions by
With 1 we denote the function which is identically one. Without changing the terms p , , p, in (9.1.1), an arbitrary function pdt) could be added to the pressure. Thus p is not uniquely determined by the incompressible equations. We use the normalization* (9.1.5)
(l,p(., t)) = 0 for all t.
Our aim is to prove
Theorem 9.1.1. Assume the compatibility condition (9.1.4) to be satisjed. The spatially periodic Cauchy problem (9.1.1t(9.1.3) with side-condition (9.1.5) has a unique solution ( u ,v,p ) . The solution is CO=-smoothand exists for all time t 2 0.
9.1.1.
Outline of the Proof; Vorticity Equation
v,p) is a solution. The first moA simplifving assumption. Suppose that (u, mentum equation (9.1.1) gives us, for the spatial average of u, d -(l,u) = (1, u t ) = 4 1 , uu,)- (1, vuy) dt
+
+ (1, F )
+
= (u, vy ,u) ( 1 , F ) = (1,F).
Therefore (l,u(.,t))=(l,f)+
I'
(l,F(-,T))dT
is known in terms of the data. If we introduce 1 1 Q = u - -(1, u), 5 = 2, - -(1, v), 4n2 4n2
then ( 1 , Q ) = ( 1 , G ) = 0 and
*The ambiguity disappears for the compressible equations and the normalization (9.1.5) can be justified by a limit process.
327
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
and similarly for G. Since the coefficients (1 , u), (1, v) can be considered as known, the study of the system for ( i i , 5 ) is very similar to that of the system (9.1.1)-(9.1.3) with
F = G = 0,
(9.1.6)
( 1 , f ) = (1,g) = 0.
Henceforth we assume (9.1.6), for simplicity, and leave the extensions to the reader. The average flow quantities vanish: (1,u) = (1,v) = 0 for all
t.
Vorh'city. The expression
< = v,
- uy
is called the vorticity. Differentiation of the first momentum equation (9.1.1) with respect to y, of the second with respect to z, and subtraction gives us the vorticity equation (9.1.7) Clearly,
+ u<, + vEy = uA<.
< satisfies the initial condition
If u, v were known, then the vorticity could be determined by the linear parabolic problem (9.1.7), (9.1.8). Conversely, as we will show, if is known, then at each time t the velocities are uniquely determined by the inhomogeneous Cauchy-Riemann system
<
u,
+ vy = 0,
v, - uy = 6,
with side-condition (l,u)=(l,v)=O. This suggests the iteration <;+I
(9.1.9)
+ ,y+' + vy;+I
= uAtn+',
uo E vo
= 0,
328
Initial-Boundary Value Problems and the Navier-Stokes Equations
We will use this iteration to prove global existence. Once u,2) are determined, the pressure p can be obtained from
Ap
+ ~ ( v , u ,- ' I L , V ~ )= 0,
( I , p ) = 0.
9.1.2. Some Results for Elliptic Equations We need some elementary results about elliptic equations, which we prove by Fourier expansions. Recall that all functions are assumed to be Cm-smooth and 27r-periodic in x and y.
Lemma 9.1.2.
If F
= F(x,y) is a function with (1, F ) = 0 , then
Aw
= F,
(1,w) = O
has a unique solution w.There is a constant K independent of F with
Thus we "gain" two derivatives. Proof. We can write W O
k#O
k = ( h, k2),
x = (2,I/),
(k, x) = h x
+ k2Y.
The sums extend over all wave-vectors k # 0 with integer components k l , k2. In terms of Fourier coefficients, the equation A w = F is equivalent to -(k;
+ k;)G(k)
= p(k).
This shows existence, uniqueness, and the estimate.
Lemma 9.1.3.
Let F, G denote functions with
G,-Fy=O,
(l,F)=(l,G)=O.
There is a unique solution cp of
cp, = F, cpy = G , (1:cp) = 0.
This function
cp is also the unique solution of
Acp=F,+G,,
(l,cp)=O.
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
329
Proof. As in the proof of the previous lemma, we write F , G, and p as Fourier series. By assumption,
kld'(k)
(9.1.10)
-
kzP(k) = 0 for all k.
The equations p, = F, py = G are equivalent to
ikl @(k) = P(k),
(9.1.11)
ik2@(k) = d'(k).
If @(k) satisfies these equations then (9. I . 12) Conversely, if +(k) is defined by (9.1.12), then (9.1.1 1) follows from (9.1.10). The remaining statements are shown in the same way.
Lemma 9.1.4. U,
Suppose that ( 1 , F ) = (1, G ) = 0. Then the system
+
V,
= F,
V, -
uY = G,
(1, U ) = (1, V ) = 0
has a unique solution ( u ,v). For each j = 1,2,. . ., there is a constant Kj independent of F, G with 2 IIUIIH, + l l V l l2H J I
KJ(lF12H3-I+ lG12H3-1).
If F and G dependent smoothly on t , then so do u and v.
Proof. If the system has a solution then
AV = Fy + G,,
AU = F, - G,, and therefore
G(k) = -i
klP(k) - k2d'(k) k: + ki '
G(k) = -i
k2P(k) k:
+ kiG(k) + ki
Conversely, if we define u and v by the above formulae, the system is solved and the estimates follow from lG(k)I2
4
+ lfi(k)I2I ,{IPWI2 + lp(k)l2). lkl
Smooth dependence on t holds, because we can differentiate the Fourier series termwise.
330
Initial-Boundary Value Problems and the Navier-Stokes Equations
9.1.3. Vorticity Formulation of the Navier-Stokes Equations The Navier-Stokes equations for the primitive variables u , u , p are equivalent to the vorticity equation together with the inhomogeneous Cauchy-Riemann system for u , u and the elliptic pressure equation (9.1.13)
Ap
+ J = 0,
J = ~ ( u , u ,- U , U ~ ) , ( 1 , ~ = ) 0.
More precisely,
Theorem 9.1.5.
Suppose that
f,
+ gy = 0, (1, f) = ( I , g ) = 0.If u , u,p
solve
+ ut +
ut
(9.1.14)
UU, UU,
+ +
+p , = U A U , + py = UAU, u, + uy = 0,
U U ~
4 2 ,Y,0) =
and
(1,P) = 0
U U ~
f(z,Y),
7J(z,y,O) = g(z, Y),
< is defined as < = u, - u y , then It + 4, + VEy
(9.1.15)
=
w,
a x , Y,O) = gx(z, Y) - f&, Y), 21,
+
7Jy
= 0,
u, - uy = E ,
(1, u ) = (1, u ) = 0,
and p satisfies (9.1.13). Conversely, i f u , v,5 solve (9.1.15), and p is defined as the solution of (9.1.13). then u, u,p solve the first set of equations.
Proof. First suppose that u , u , p solve the equations (9.1.14). The system (9.1.15) has been derived in Section 9.1.1. Also, differentiation of the first momentum equation with respect to z and of the second with respect to y yields, for the pressure, Ap
+ J = 0,
J = U,U,
+ 2 ~ ~ +2 U1 ~~ =V 2(v,uy ~ -
U,U~).
This proves the first part of the equivalence. Conversely, assume that a , u , solve the equations (9.1.15). We define F and G by
<
+ U U , + uuy - UAU= F, Vt + UU, + U U ~ UAU = G,
ut
and obtain
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
331
By Lemma 9.1.3 there is a unique solution p of p, = F,
py = G,
( 1 , ~= ) 0.
Clearly, if we set p = -p, the momentum equations are satisfied by u, v , p. Also,
A(P= F,
+ G,
= -~(v,u, - U , W ~ ) ,
and therefore -9 = p is the solution of (9.1.13). The initial conditions u =
f, z1 = g at t = 0 follow from the uniqueness of the solution u , v of u,
+ vy = 0,
and the initial condition for <,
v, - uy = [,
< = g, -
fy
(1, u)= (1, w) = 0,
at t = 0.
9.1.4. Uniqueness and Existence To begin with, we show uniqueness; we assume that u j , wj,p j , j = 1,2, solve (9.1.14). Subtraction yields for the differences U. = u I - 2 ~ 2 ,etc. U.t
+ U I U , + v ~ Q+, G U ~ +, 6'212, + jj,
=~Aii,
~ t + . t l 1 V , + ~ 1 d , + i i ~ 2 , + f i ' ~ ~ =uAV, ~+~~
U.,
+ Gy = 0.
Thus, using integration by parts, I d
--{11~112 2 dt
+ llfi11*} = (ii,f i t ) + ( f i , V t ) 5 KT{llU.l12+ llfill2},
0L t 5 T,
and therefore the initial conditions imply that U.=V=O.
Furthermore, we obtain from (9.1.13) that Ajj = 0, (1, p ) = 0, and thus p = 0. This shows the uniqueness of the solution of (9.1.14). To prove existence we use the iteration (9.1.9) starting with uo = wo z 0. For every fixed n we have linear equations with Cm-coefficients; thus u",v", [" exist for all time. (See Lemma 9.1.4 for the determination of un+l, v"+' in terms of < " + I . ) We first show the following estimate for the sequence <".
Lemma 9.1.6. Let h = gz - fy denote the initial data of <". There is a constant K depending on u and 11 h ( l H 1 , but independent of n and t with (9.1.16)
II<"(-,t)11;, 5 K ,
71
= 1,2,... ,
t 2 0.
332
Initial-Boundary Value Problems and the Navier-Stokes Equations
Proof. a) We write E = tn+‘,u = u n , v = vn; thus
and thus
4 6 , uC,)
=
1 p,, 0.
A similar computation for (<, vCy) and the relation u,
Hence we have, for all n,
+ vy = 0 yield
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
333
and therefore
d CI = CI(V). I CI lulk I&, dt c) A Sobolev inequality (Theorem A.3.6) and Lemma 9.1.4 give us that (9.1.19)
- [El;,
IU
2 1% I ~211u~~1I$ 5 QIE n IHI.
n2
d) To summarize, if we add
and (9.1.19), we obtain that
Here c is a constant depending only on v. By (9.1.18), Q
:= c
6'
l<"l;
d r 5 const llh1I2.
Therefore,
IIC"+'(.,
t>11;1 I eu h l 11;l
is bounded independently of n and t . Next we show that all space derivatives of tn can be estimated independently of n in any given time interval. It is convenient to note that mixed space derivatives can always be estimated by pure space derivatives. More precisely, for all functions w , (9.1.20)
b1;J I Tj{11D:'w112 + llD:w112}
where rj is a numerical constant independent of w. This can be shown by Fourier expansion. (See formula (A.3.2) in Appendix 3.)
Lemma 9.1.7. Suppose that the sequence En is defined by the iteration (9.1.9), and T > 0 is arbitrary butfued. For each j = 1,2, . . ., there exists h; with II'$''(',t)l/HJ
t I T. I h;., 0 I
The constant Kj depends on v, T , and IlhllHJ,but is independent of n.
Proof. We abbreviate, as before, = ["+I, u = u",21 = v" , and let j 2 2. Using induction on j , we can assume the above estimate to hold up to j - 1; thus
334
Initial-Boundary Value Problems and the Navier-Stokes Equations
lIJnll~1-lI Kj-1,
I C1Kj-l.
llul(~3
Applying the operator D{ to (9.1.17), we obtain that
D{& = --D;(&)- D{(v&) + v A D ( { . Therefore,
5 (Of+'<,D{-I(u&)) + (D(+'(, Df-'(u&)) - .(1D{+'[(12
I c 2 { llD;-1(u€z)l12+ llD{-l(~<Jlz}, c 2 = c 2 ( v , j ) . The differentiated products in the last formula are evaluated by Leibniz' rule. One obtains an estimate in terms of (9.1.21)
Il(D;~)(Df-'tE)11~, II(D:v)(Df-'-kD2€)112, 05k
I j - 1.
Consider the u-terms for definiteness,
ll(D:~)(~{-'<)Il2 I 1D:u1~11D~-"112. For 0 5 k < j - 2 :
IDI".I,'
I
2 C31l~II*l
2
I c4q-*,
and
llD;-k
5
11<11LJ'
Fork=j-1:
IDf"ul$
=
lD{-lul$
I CS((
and
llD;-"Il2
= llD1tl12 I K:.
A similar estimate applies to the v-terms in (9.1.21). Thus we have shown that
Clearly, the term d
-$IID;€"+' 112 can be bounded in the same way. Introducing the functions Gy(t) = I(D;t"(-,t)I12 + II@5"(*, t)I12
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
335
and observing (9.1.20), we have that
d G ; + l ( t ) I c{ 1 dt
+ Gj”(t)+ G,”+l(t)}, 0 I t I T ,
GJ(0) I lhIk5. Here c does not depend on n. Therefore, by Gronwall’s Lemma 3.1.1,
G; +’ ( t)I K { 1 +
1 t
GJ(r)dT), K = K(T),
in 0 5 t I T . By Picard’s Lemma 3.3.4 we obtain the desired bound independent of n. This completes the proof of the lemma. The above considerations (and Sobolev inequalities) show that we have bounds independent of n for all derivatives of the functions unl un,
tn
in 0 _< t _< T. We can now argue in exactly the same way as in the proof of local existence for Burgers’ equation; see Theorem 4.1.6. Thus - in any time interval 0 5 t I T - the sequence u ” ? u n , tn converges along with all its derivatives to the solution u, u, of (9.1.15). The Equivalence Theorem 9.1.5 shows existence of a solution u,u,p of the N-S equations.
<
Theorem 9.1.8. Consider the system of equations (9.1.15) with initial data h = gz - f y where fz
+ Qy
= 0,
(1, f) = (1,Q) = 0.
There is a unique C”-solution. The solutions exists for all time.
9.1.5.
Maximum Principle and Smallest Scale
It is an important property of the vorticity (in 2D) that it obeys a maximum principle. We formulate this next.
Lemma 9.1.9.
For all t 2 0 the vorticity t satisjies
I<(.,
t)lm
I It(.,0)Im.
Proof. Let cr > 0 be a constant and set
&, Y,t ) = e - a t t ( Z , Y,t).
336
Initial-Boundary Value Problems and the Navier-Stokes Equations
The vorticity equation yields
Suppose
< attains its maximum over z , y ~ R ,O l t l T
in (zo, go, to) with ~ ( ( I cyol o , to)
> 0. If 0 < to I T then
CT = ty = 0, & 2 0,
A< 5 0
to); this contradicts the differential equation for f . Thus we have
at
(20, yo,
to
= 0; i.e., a positive maximum can only be attained at t = 0. Similarly, a
negative minimum can only occur at t = 0. If we send a follows.
<
--+
0, the estimate for
The maximum principle allows one to improve the estimates of the previous section considerably. In Henshaw, Kreiss, and Reyna (1988) it is proved that
Jj2W = [ID{€(.!t)1I2+ 11D;[(.,
t)1I2
can essentially be bounded in terms of
If [(x, t ) =
[(k, t ) e i ( k . x ) k
denotes the Fourier expansion of the vorticity, these results imply that
provided that l<(.,0)lm = O(1). Thus, there is very little energy in the high wave-numbers Ikl >> v-‘I2, and therefore the smallest spatial length scale is N
y’P.
We have restricted ourselves to smooth initial data. However, in the same way as for Burgers’ equation, we can show a smoothing principle for the vorticity: We can estimate t ~ l l & t>ll’,,
in terms of II<(.,0)(12.Therefore we can define generalized solutions for nonsmooth initial data.
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
337
9.2. The Spatially Periodic Case in Three Dimensions As in the previous section, we restrict ourselves for simplicity to the case with zero forcing. The equations have the form
(9.2.la)
ut
+ uu, + vuy + wu, + gradp = vAu.
v
> 0,
divu = 0,
(9.2.lb)
u(x, 0) = f(x), div f = 0.
(9.2. Ic)
Without further mentioning, all functions in this section are assumed to be real, CX-smooth and 27r-periodic in x, y, z . We require that (l,f,)=O,
i = 1,2.3,
and obtain, as in the 2D case,
t 20,
(l..(.,t))=(I,v(.,t))=(l,w(..t))=O.
as long as the solution exists.
9.2.1. Vorticity Formulation; Local Existence In three space dimensions the vorticity is defined as the vector UlY -
u,
(9.2.2)
If one applies the curl-operator to the momentum equations and observes that div u = 0, then one finds after some computation the vorticity equation (9.2.3)
tt
+ utz + vtY + w t Z - B(u)t
vat.
Here B(u) is the Jacobian matrix of the velocity field, uz
uy
11,
w,
UlY
U’,
To show a local existence result, we want to use an iteration like (9.1.9) in the 2D case. To this end, we first note that d i v t = 0, as follows directly from the definition (9.2.2). Also, integration by parts implies the vanishing of the spatial averages (1,tL(..t))= 0,
i = 1.2,3.
338
Initial-Boundary Value Problems and the Navier-Stokes Equations
This allows us to determine u in terms of system. We show by Fourier expansion:
Lemma 9.2.1.
< by a generalized Cauchy-Riemann
Suppose that [ = ((x) satisfies
div[=O,
(l,&)=O,
i = 1,2,3.
Then the system
with side-condition
(1,u)=(1,v)=(1,w)=O has a unique solution u. For each j = 1,2, .. . , there is a constant Kj independent of [ with
ll~l12,JI Kjl
~ y- € 2 2 .
These equations allow us to express the Fourier coefficients of u, v, w in terms of the Fourier coefficients of
This shows uniqueness and the estimates. Conversely, defining u,u , w in terms of its Fourier coefficients by formulae as above, we obtain existence.
To prove local existence for the N-S equations, we consider the sequence U",
<",
72
= 1,2, " ' 1
339
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
(l,urL+I)=(I:Zln+')
= ( I , w n + ' ) =o,
starting with uo = 0. In contrast to the 2D case, one obtains here an estimate of l l ( l l H l only in a finite (small) time interval 0 5 t 5 T, where T depends on the HI-norm of the initial vorticity, i.e., on ((curlfllHI. Then one can show - as in the 2D case - that the functions u", tn are uniformly smooth in this interval 0 5 t 5 T. As before, it follows that the functions un, I" converge along with all their derivatives to C"-functions u, ( which solve the vorticity equation (9.2.3) and the generalized Cauchy-Riemann system (9.2.4) at each time t , 0 5 t 5 T. To obtain a solution u, p of the N-S equations, it remains to determine the pressure. We take the divergence of the momentum equations to find
Ap+J=O,
+ vYvY + u1,w, + 2{2),uY + wsu, + wyu,} = 2{v,uy - u,vy + w,u, - u,w, + wyv, -
J = u,u,
UyUIr}.
If we impose the side-condition (1, p) = 0, the pressure is uniquely determined. (Note that (1, J) = 0.) Except for the analog of Lemma 9.1.6 (which is replaced by a local result), these details are more or less the same as in the 2D case. Also, the uniquenes of a solution follows as in Section 9.1.4. We summarize the result in
Theorem 9.2.2. The spatially periodic Cauchy problem for the 3 0 viscous incompressible Navier-Stokes equations with C"-data has a unique C" -solution existing in some time interval 0 5 t 5 T . The time T > 0 depends only on the viscosity Y and on llhllHl. Here h = curl f is the vorticity at time t = 0. 9.2.2.
Extension of the Solution Interval for Bounded Velocities
It is not known whether the solutions u, p of the viscous incompressible N-S equations (9.2.1) exist for all time 0 5 t < 00 or whether it is possible (for some initial data) that the solution ceases to exist due to the development of a singularity in finite time. If one assumes a solution in a time interval
OSt
340
Initial-Boundary Value Problems and the Navier-Stokes Equations
is finite, then the solution can be extended beyond T. In other words, if the solution ceases to exist at t = T, then the function
ll€(4)llH,
1
0
I t < T,
must have a singularity at t = T. The boundedness of ness of the velocity:
14m I CI
II~1IH2
lltllH,implies bounded-
1. C 2 l l t l I f , l .
In this section we want to show that boundedness of the velocity is also sufficient to extend the solution beyond T. One can prove even more, namely estimates of all derivatives of the solution in terms of the initial derivatives and the maximal velocity.
DI = d / d z ,
0 2
= d/dy,
0 3
= 8/82,
lu(., t)l, = max Iu(x, t)l. X
We assume throughout that u, p is a smooth solution of (9.2.1) defined in 0 1. t < T,we start with the basic energy estimate. This estimate is valid without any assumption on lul, .
Lemma 9.2.3.
The energy-change satisfies
and therefore
Proof.
From (9.2.1a), ' d 2 dt
2
- - llull = (u, u t ) =
-S - (u, gradp)
+ v(u,Au).
Here S consists of nine terms,
s = (u,uu,)+ (u,vuy) + (u,wu,) + (v,uv,) + ( v ,V V y ) + ( v , w'u,) + ( w ,21%) + (w,vwy) + (Wl ww,).
341
The Incompressible Navier-Stokes Equations: The Spatially Periodic Case
Integration by parts yields that ( u ,uu,) = ( u2 , u,) = -2(uuz, u ) = 0,
and similarly 1 2 (PL, u u y ) = - - ( u
2
, vy)
Therefore,
Furthermore,
(u,Au) = (u.uzx)
+ (u.
uVV)
+ (u.u,,)
= -JI
2
,
and the lemma is proved. We now proceed to estimate the first space derivaties of u and assume the velocity to be bounded, IUlcx.T
:= sup lu(.,t)lcc O
< 00.
Since the dependence of the estimates on the viscosity u is of some interest, we will make it explicit below. The constants c, C I ,c2, etc. are numbers independent of u, T and the solution u under consideration.
For the function J1 ( t )measuring the first space derivatives Lemma 9.2.4. of u we have that
The right-hand side also is a bound for
Proof. Application of any of the operators D = DI, D2r
0 3
to the momentum equations yields
Du, + D { u u ,
+ vuy + w u , } + grad Dp = uADu
342
Initial-Boundary Value Problems and the Navier-Stokes Equations
Therefore,
I d 2 dt
- - I(Du112 = (Du, Dut)
= (D2u,uu,
+ YU, + wu,) - u { IJDu,112+ IIDu,112 + IIDu,112}
I CI 1~1mJl-72 - ~ l l D 2 U l l 2 . Summing these three estimates for D = D I , D2, D3, we find that
Integration of the inequality - together with the estimate of 9.2.3 - proves the result. We want to show now a similar estimate for (9.2.6)
J2(t); more
J J: d t by Lemma
precisely,
2uJ;
Then we can proceed exactly as in the proof of the previous lemma and obtain an estimate of J2(t) in terms of
TO show (9.2.6), we apply any of the operators
D2 = Di,D:, 0.: to the momentum equations:
D2ut
+D
2
{uu,
+ wuy + wu,} + grad D2p = uAD2u.
Therefore,
I -(D2u, D2{uu, + YU,
+ W U L } ) - ul(D3u112.
Now Leibniz’ rule is applied to the term
D2{uu,
+ YU, + wu,};
for example, D2(vu,) = (D2v)u,
+ 2(Dv)(Du,) + vD2u,.
The Incompressible Navier-Stokes Equations: Thc Spatially Periodic Case
343
Typical terms which need to be estimated are
(DZU,(D2v)uJ. (D*U.( D v ) ( D u , ) ) , ( D h ,vD?u,). There is no difficulty in bounding the third term by IuI,
J2J3.
(Actually, the three terms of this form add up to zero since divu = 0). Also, we can use integration by parts to remove the first derivative from uy and from Dv in the first and in the second term, respectively. This shows that (9.2.6) holds. To summarize, if the velocity is bounded in 0 5 t < T , then Jl(t), &(t) are also bounded. Therefore,
IIU..t)lI,,,
-
0 I t < T.
is bounded, and our previous considerations show that the existence interval can be extended beyond T.
Theorem 9.2.5.
lfthe solution u to (9.2.1) satisjies a hound sup{ lu(., t)l, : 0 5 t
(9.2.7)
< T } < m.
then u can he extended to a solution in an interval 0 5 t
Remark.
< T + AT, AT > 0.
Instead of (9.2.7) one only needs to assume SUP{
(u(.,t), [u(..t)lu(..t ) ) : 0 5 t < T } < ocj.
Then the solution can be extended beyond T; see von Wahl (1985).
This Page Intentionally Left Blank
10
The Incompressible Navier-S tokes Equations under Initial and Boundary Conditions
In two space dimensions the nonlinear equations have the form (10.1.1)
ut
+ uu, + vuY + gradp = V A U+ F,
u,
+ ul/ = 0,
u = ( u ,v). F = ( F ,G), x = (z,y). We consider the equations in the region
OlZLl,
-co
t>o,
and prescribe initial conditions
u ( r ,Y,0 ) = WAZ.Y). d r ,y. 0 ) = V O ( T , y),
mr
+ uol, = 0 ,
and boundary conditions at z = 0, T = 1. All data are assumed to be Cm-smooth and 2n-periodic in y; we seek a C"-solution which is 2n-periodic in y.
10.1. The Linearized Equations in 2D In this section we start our discussion of the linearized equations under boundary conditions. To this end, let
345
346
Initial-Boundary Value Problems and the Navier-Stokes Equations
u, v, P, u, + v,
= 0,
denote smooth functions of x, y, t which are 2r-periodic in y, and substitute
u=U+u’, v = V + v ’ , p = P + p ’ into the N-S equations. Neglecting terms quadratic in the corrections u’, etc. and dropping the prime ’ in our notation, we find the linear equations (10.1.2)
ut
+ Uu, + Vu, + Au + gradp = vAu + F,
u,
+ vy = 0,
where
The forcing function F in (10.1.2) is the defect of (U. V , P ) in (10.1.1). It is convenient to study (10.1.2) for a general smooth matrix function A(z.y. t) which is 2r-periodic in y. Our plan is to approximate (10.1.2) by the evolutionary system (10.I .3a) (10.1.3b)
ut
+ Uu, + Vu, + Au + gradp = vAu + F, t p t + u, + uy = 0 , E > 0.
v. p) in such a way that our theory We shall choose boundary conditions for (u, for mixed parabolic-hyperbolic equations applies for every fixed E > 0. Then, if we can estimate the solutions of (10.1.3) and their derivatives independently of E , we obtain a smooth solution of (10.1.2) in the limit E 0. We start with the basic estimate. ---f
Lemma 10.1.1. Suppose that u, p solve (10.1.3). There is a constant c > 0 , depending on the coefficients U , V , in the differential equation (10.1.3) but independent oft and F, with (10.1.4)
(Here we use the notation
for boundary terms.)
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions
347
Proof. The differential equations (10.1.3) yield
= - (u, Uu,) - (u, Vu,) - (u, Au) - (u, gradp)
+ V(U, Au) + (u,F) - @, + vy). U,
The result follows from integration by parts and estimates of zero-order terms. The boundary contributions appear from integration by parts in the x-variable.
Boundary conditions providing the basic estimate. The boundary conditions
- together with the term
on the right-hand side of (10.1.4) - have to provide bounds for the boundary term (10.1.5)
) - UP
+
V(UU,
+ VV,)
x=l
We consider different possibilities.
Case 1. The lines x = 0, x = 1 represent walls. In this case it is reasonable to prescribe the boundary velocities u=v=O
at x = O , x = 1
for the nonlinear system (10.1.1). (This is obvious for u and confirmed by observation for v.) Thus one chooses a base flow with
U=V=O
at x = O , x = 1
u=v=O
at r = O , x = 1
and obtains (10.1.6)
for the linearized system. Clearly, the boundary term (10.1.5) vanishes, and the basic estimate follows.
Case 2.
Inflow at x = 0, outflow at x = 1. Now one chooses
U(O,y, t)
> 0, U(1,y, t) > 0.
Again, we can use the Dirichlet conditions (10.1.6). Also, the following conditions of Neumann type may be used:
348
Initial-Boundary Value Problems and the Navier-Stokes Equations
I
x= I
+ v 2 )- u p + u ( p - au - 9 ) - v(pv + h ) } x=O Here
etc. Using a (one-dimensional) Sobolev inequality for each fixed y and integrating over y, we have (10.1.8) Thus the basic estimate follows from Lemma 10.1.1.
Remarks. 1. The above boundary conditions are of the general form discussed for mixed parabolic-hyperbolic systems in Section 8.5. Therefore, if smooth initial data are given for u , z1, p and provided that suitable compatibility conditions are fulfilled at t = 0, the equations (10.1.3) determine a unique smooth solution satisfying these boundary conditions. 2. In many applications the viscosity constant v > 0 is very small. Then, if estimate (10.1.8) is employed, rapid exponential growth of the energy is allowed. However, if the coefficients a j , pj in the boundary conditions (10.1.7) are suitably chosen, one obtains an estimate of the boundary term (10.1.5) by c(11g11; llh11$}. In this case, inequality (10.1.8) need not be employed, and the rate of exponential growth becomes independent of v. The same is true, of course, for Dirichlet boundary conditions. 3. It is no restriction to assume the Dirichlet conditions (10.1.6) to be homogeneous. If inhomogeneous data are given, we can introduce new variables ii = u - q5 which satisfy the homogeneous condition, and if we differentiate with respect to y and t, the condition remains homogeneous. In contrast to this, consider (10.1.7). Of course we could also transform to the homogeneous case, but if we want to estimate y- and t-derivatives, new inhomogeneous terms are introduced, and nothing is gained.
+
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions
349
4. We have assumed conditions of the same type at x = 0 and x = 1, either of Dirichlet or of Neumann type. Clearly, this assumption is not necessary. In applications one often specifies u = w = 0 at inflow and (10.1.7) at outflow. If v > 0 is small and (Y,p are suitably chosen (see Remark 2), such a Neumann condition at outflow leads to a “smoother” solution than the simple requirement u = z1 = 0 at outflow.
10.2. Auxiliary Results for Poisson’s Equation In this section we prove some elementary estimates for solutions of Laplace’s equation and Poisson’s equation in the strip
0 5 2 5 1,
-03
<
03.
As in the last section, all functions are assumed to be C”-smooth and 27rperiodic in y. We apply Fourier expansion in y-direction and use the notation m
u(x,y) =
&1
2s
G(x,k)eikYl G(x,k ) =
u(2, y)ePikydy.
k=-m
Then Parseval’s relation reads
and integration over x gives us (10.2.1) k=-m
Lemma 10.2.1.
Suppose that u E C” solves
and u is 27r-periodic in y. There is a constant KI independent of u with
r f the spatial average of u vanishes, i.e.,
350
Initial-Boundary Value Problems and the Navier-Stokes Equations
then
11412I K211UZII 2 with K2 independent of u.
Proof. Since Au = 0 it follows that
CZZ(x,k) - k2C(x,k) = 0, k
= 0, f l , .
..
Thus we have a representation
(10.2.2)
C(x,k) =
ake-lklZ + bkelkl(Z-l)
Using (10.2.1) for u y , we find that
Similarly,
Elementary computation shows that (for k
Using
for all integers k
# 0.
# 0)
k # 0, k = 0.
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions
To show the estimate for
1 ) 2 ~ 1 1 ~we ,
first observe that
I
0=
35 1
C(x,O)dx = ao
1 + -bo, 2
and therefore C(X,O)
= bo(x
-
1 2
-).
Thus (10.2.1)yields ll.1L1I2
I I
lIuy112
lluy112
+ 27T
1 I
lCiL(x,0"
dx
0
+ 2TlboI2 I
lluy112
+ ll~z112.
This proves the lemma.
An easy generalization of the last lemma is
Lemma 10.2.2.
Suppose that u E C" solves
Au=O
in O I x I l ,
and u is 2r-periodic in y. For every j of u such that
--oo
2 1 there is a constant h; independent
Proof. The equation Au = 0 allows us to express even order s-derivatives in terms of y-derivatives:
d2'u 8x2'
-= ( - 1 )
'a2'u I3p
Thus, any derivative term appearing in 1uIHJreduces to
The estimate of the last lemma finishes the proof. Next we want to show estimates of u in terms of boundary data on the lines x = 0. z = 1.
352
Initial-Boundary Value Problems and the Navier-Stokes Equations
Lemma 10.2.3.
Let 2r-periodic C"-functions go(y), gI(y) be given. The boundary value problem
Au = 0, 4 0 , Y) = go(y),
4 1 , y) = 91 (y)
has a unique C"-solution u(x,y) which is 2~-periodicin y. For any j = 0, 1 , ... there is Ki independent of g with 2 llullkJ 5 KjllgllHJ(r)'
Here
11911kJ(r)=
119011kJ
+ (19111kJ
denotes the Hi-norm of the boundary data.
Proof. First assume that there is a smooth solution u. We use (10.2.1) and the representation (10.2.2) to obtain
On the other hand,
k=-cc
The formula (10.2.2) gives us the relations
Thus we find that
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions
353
If we apply this estimate to @-Iu. -1
instead of u, and use Lemma 10.2.2, then we obtain the desired bound of 11~11%~. The bound clearly implies uniqueness. Existence of a solution follows , because we can define u in terms of its Fourier expansion. Now consider the inhomogeneous differential equation (10.2.3)
Au = F ( x , y)
where F E C” is 2r-periodic in y. We ask for estimates of a Cm-solution with homogeneous boundary data (10.2.4)
u(O,y)=u(l,y)=O,
-co
and require, as before, that u is 2r-periodic in y. We show The above strip problem has a unique solution u. For any Lemma 10.2.4. j = 0, 1 , . . ., there is a constant Kj independent of F with
In this sense, we “gain” two derivatives. Proof. First assume that the problem has a solution u. Fourier expansion of (10.2.3), (10.2.4) yields (10.254
G z z ( x ,k ) - k2G(x, k ) = E ( x , k ) !
(10.2.5b)
G(0,
k) = a( 1, k ) = 0.
Thus each function G ( . , k ) , k = 0 , f l , ...,
is determined by an ordinary boundary value problem. By
we denote the L2-norm of such a function of x , and obtain through integration by parts (for k # 0)
354
Initial-Boundary Value Problems and the Navier-Stokes Equations
Thus
k 4 i i w ,k)ii2
I IIPC,k)it2;
and with (10.2.5~) IIGxA., k)ll L k2IlW, k)ll
+ lip(.,QII
L 2 1 1 k k)ll. For k = 0 an explicit integration of the boundary value problem (10.2.5) shows that
Il l ~ ( . ~ O ) I l .
llfi(.,O)Il
Thus we have obtained that (1
+ rc4)tta(..k)ti2+ (1 + I ~ ~ ) I I Q , ( .IC)II’ , + IIM.,
k)ii2
I c t ~ ~ ( . ,IC)II~.
and Parseval’s relation (10.2.1) yields ll.lL11~2
I h61tF112.
This shows the desired bound for j = 0. There are no difficulties in estimating higher y-derivatives of 21.
ux,
uxx
because (10.2.3), (10.2.4) can be differentiated with respect to g . If we want to estimate higher 2-derivatives, we use (10.2.3) and replace them by y-derivatives, e.g., uxxx
= Fr
- uxyy.
Thus we obtain the estimate of the lemma. Existence of a Cm-solution follows as before since we can define u by its Fourier expansion. If both - the boundary data and the differential equation - are inhomogeneous, i.e.,
AIL= F ( r . y).
4 0 ,.v) = go(.y),
~ ( 1 Y). = 91(Y).
then we decompose the problem in an obvious way, and obtain the solution as a sum,
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions
355
10.3. The Linearized Navier-Stokes Equations under Boundary Conditions The linearized system (10.1.2) is not of the standard form of an evolution equation since we do not have an equation for p t . To show the existence of a solution of (10.1.2) under initial and boundary conditions, we go over to (10.1.3) for E > 0 and send E + 0.
10.3.1. Convergence Theorem We consider the system (10.1.3) and restrict ourselves, for simplicity, to the no-slip condition (10.3.1)
u=u=O
at z = O , z = l
and the initial condition (10.3.2)
u(z,y, 0) = 4x7 y, 0 ) = P ( Z , Y,0 ) = 0.
As previously, the forcing function F and the coefficients U, V, A in (10.1.3) are assumed to be Cm-smooth and 27r-periodic in y. Also, we require that (10.3.3)
@F(z,y,O)/dtj = @G(z, y , O ) / d t j = 0, j = 0, 1,2, .. ..
This ensures compatibility of the data at t = 0. For each E > 0 the initialboundary value problem (10.1.3), (10.3.1), (10.3.2) has a unique Cm-solution
u = u%, y, t ) , p = p C ( z Y, , t) which is 27r-periodic in y. To begin with, note that at t = all derivatives of u, p are = 0, as follows from (10.3.3). Our aim is to show that all derivatives of u, p can be bounded independently of E in any interval 0 5 t 5 T. Then, as E + 0,
we obtain a smooth solution of the linearized Navier-Stokes equations.
As remarked earlier, the solution is only unique if one fixes a (time-dependent)
constant to determine the pressure, e.g., (10.3.4)
(1 P(., t ) ) = 0. 1
356
Initial-Boundary Value Problems and the Navier-Stokes Equations
We will show
Theorem 10.3.1. (10.1.2) in
Consider the linearized viscous incompressible equations O<x
--oo
t2o
with boundary conditions u = u = 0 at x = 0, x = 1, initial condition u = u = 0 at t = 0, and side-condition (10.3.4). Assume that the data and coejjicients are Cm-smooth, 27r-periodic in y, and fulfill (10.3.3). Then there is a unique C"-solution which is 27r-periodic in y. In any interval 0 5 t 5 T, the solution is the limit of the corresponding solutions of (10.1.3) as E -t 0. The assumptions of the theorem can be relaxed: One can allow, for example, certain inhomogeneous initial conditions and different boundary conditions; see Section 10.3.2. The proof of the estimates of all derivatives of u = u', p = p c proceeds in several steps. We fix a time interval 0 5 t 5 T. For brevity, we will call a function w = w ' ( x , y, t) estimated, if we have established a bound for
which is uniform in 0 < E 5 1. As previously, the main difficulty is estimating x-derivatives, because one cannot differentiate the boundary conditions in xdirection.
Step I . The basic estimate (see Lemma 10.1.1) gives us bounds for u, ~ p We . can differentiate the differential equation and the boundary conditions arbitrarily often w.r.t. y and t and obtain systems of the same form where the lower-order terms are already estimated. Thus we get bounds for all y, t-derivatives of u7 ~ p . In particular, we have bounded d
-{lbIl2 dt + EllPIl2), and the basic estimate (10.1.4) gives us a bound for u,. From the differentiated systems we obtain, with the same argument, bounds for all y,t-derivatives of u,. To summarize, we have estimates for
and all y, t-derivatives of these functions.
+
Step 2. We differentiate the equation Ept u, + zly = 0 w.r.t. x and replace ux, using the first equation (10.1.3~).Then we obtain
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions EVPtX
357
+ Px = H I ,
H I = F - U t - U U , - V U ,- uwxy - allu - ~
1
+ 2u u Y~ y ,
where the function H I is already estimated. Integrating the above ordinary differential equation for p x ( x , y, t) in time and observing that
we have bounded p,. Also, since all y,t-derivatives of H I are estimated, we have bounds for all y, t-derivatives of p,.
Step 3. Differentiating the u-equation (10.1.34 w.r.t. z,the w-equation w.r.t. y, and summing the two results, we obtain that (21,
+ u y ) t + U ( U , + uy)x + V ( U ,+ vy)y + A p + L(u, uz1uy) = uA(u,
+ v,) + F, + G,,
where L(u, u,, uy) is a linear expression in u,u,, uy. We replace u, -tpt and find that tvApt H2 =
Fx+ G,
+
E (ptt
+ vy by
+ A p = H2,
+ Up,, + V P , ~ )- L(u, u,, u,).
The function H2 is already estimated, and using the same argument as in Step 2, we have established a bound for the function A p =H
and all its y, t-derivatives.
Step 4.
At each time t
2 0 the pressure p can be written as a sum P=Pl+P2
where Apl = O
1
P l ( 0 , Y l t ) = P(OlY,t)l
Pl(l,Y,t) =P(l,Y,t),
and (10.3.5)
AP2 = H ,
P2(0,y, t ) = P2(1, Y, t ) = 0.
From Lemma 10.2.4 we obtain bounds for p z , p2,, m ,, and all y, t-derivatives of these functions. In Step 2 we have bounded the function p , and all its y l tderivatives; thus we can estimate the difference p l , and all its y, t-derivatives.
358 Step 5.
Initial-Boundary Value Problems and the Navier-Stokes Equations
We want to derive a bound for pl itself. To this end note that (1,p(., t ) )= 0,
+ + vy = 0 and the boundary conditions. Therefore, the
as follows from ~ p t u, function
1 PI(z,Ytt)= m ( z , y , t ) + 2.1,(1’P2) has spatial average zero and, using Lemma 10.2.1, we can bound PI. (Note that = PI,.) Since p 2 is already bounded, we obtain an estimate for pl itself. In the same way we obtain also a bound for each time derivative pit, p l t t , etc., and Lemma 10.2.2 yields bounds for all other derivatives of p l . Thus we have established estimates for all derivatives of p l .
PI,
Step 6. We have shown estimates for p , p,, p,,, u, u, and all y, t-derivatives of these functions. It remains to bound higher z-derivatives (and their y, tderivatives); this can now be done recursively as follows: The equations (10.1.3a) can be solved for u,,, v,,, and therefore these functions are also bounded. Thus all first derivatives of H2 are estimated, and (10.3.5) gives us bounds for all third derivatives of p. Then (10.1.3~)yields bounds for u,,,, u,,,,. A simple induction argument finishes the proof.
10.3.2. Remark on Initialization In the last section we have assumed that the initial conditions are homogeneous. Let us explain the reason for this. Suppose that we would give general nonhomogeneous initial data (10.3.6)
4x1
Y10) = f(z,Y),
4 2 ,Y,0 ) =
dz,Y),
P(Z,
Y,0 ) = N z , Y).
For every fixed E > 0 the corresponding initial-boundary value problem (10.1.3) has a solution. However, we need bounds of the derivatives which are independent of E . Our estimates of the previous section show these bounds if the y, t-derivatives are bounded independently of E at t = 0. For the y-derivatives we have no difficulties, provided the boundary conditions are compatible with the initial conditions. Therefore, the crucial question is if one can bound the time derivatives independently of E at t = 0. By (10.1.3b) the first time derivatives are bounded independently of E at t = 0 if and only if (10.3.7)
u,(., 0 )
+ vy(., 0 ) = Edl,
dl = O( 1).
The Incompressible Navier-Stokes Equations under Initial and Boundary Conditions
359
Thus, to first approximation, the initial data have to satisfy the divergence relation. Differentiation of (10.1.36) with respect to t gives us Eptt = - ( u x t
+ v,t)
= Ap
+ H ( u , V) - F, - G,.
Here H ( u ,v) is an expression in u,v and its space derivatives. Thus, the second time derivatives are bounded independently of E if we have, at t = 0, (10.3.8)
Ap
+ H ( u , t ~ -) Fx - G,
= € p i . pl = O(1).
We can consider (10.3.8) as an equation for the pressure. For the third time derivative of p we obtain 2
(10.3.9)
+ ~ { H t ( u , v-) Fxt - G , t } = - A ( u , + v,) + E { Ht(u,V) - F,t - G , t }
pttt = &t
= E { -Ad,
+ H ~ ( u , - F,t V)
- G,t}.
Thus we have to choose dl so that
-Ad,
+ Ht(u,V)
-
F,, - G,t = Ed*,
d2 = O(1).
Note that we can use (10.1.3~)to express Ht(u,v)in terms of u , v and their space derivatives. Further differentiation of (10.3.9) with respect to t gives us an equation for pl . This process can be continued. We can ensure that more and more time derivatives are bounded independently of E by choosing the initial data so that the above relations are satisfied. The easiest way to comply with all requirements is to give homogeneous initial data and to request (10.3.3). This case has been treated above. However, more general data are allowed as long as they satisfy the above requirements and lead to bounded time derivatives. To choose initial data in this way is called initialization by the bounded derivative principle. In applications, one often solves compressible equations which are almost incompressible. Here a similar problem occurs: To ensure that the solution is close to a solution of the incompressible equation, one has to “prepare” the initial data. The principle is the same, one chooses the initial data so that a number of time derivatives at t = 0 remain bounded independent of the compressibility. For details, see Kreiss (1985).
10.4. Remarks on the Passage from the Compressible to the Incompressible Equations Consider the nonlinear system (10.1.1) and choose functions (an approximate solution)
360
Initial-Boundary Value Problems and the Navier-Stokes Equations
u, v,P, u, + v, = 0. For example, the functions may satisfy inhomogeneous boundary and initial conditions. We substitute u=U+u',
v=V+v',
p=P+p'
into (10.1.1) and obtain equivalent (nonlinear) equations for the corrections u', v', p'. If we drop the prime ' in our notations, the equations read (10.4.1)
ut + ( U +u)u, + ( V +v)u, +gradp = v A u + F ,
u,
+ v, = 0.
Here F is a new forcing which is determined by U , V, P. This system can be approximated by (10.4.1) together with (10.4.2)
Ept
+ u, + vy = 0,
E
> 0.
If we have boundary conditions (10.3.1), (10.3.2) and assume (10.3.3), then we can proceed in the same way as above for the linearized equation. As E 0, we obtain convergence to a solution of the nonlinear incompressible equations. The process which has been chosen here to obtain a solution of the incompressible equations does not describe the passage of the compressible to the incompressible N-S equations. If one wants to study this limit, one should replace (10.4.2) by --f
(10.4.3)
€{Pt
+ (U + u ) p , + (V + v)p,} + + wy = 0. 1 '1,
+
(We recall the continuity equation pt div(pu) = 0 and formally substitute p = 1 ~ p . )In both cases, (10.4.1) with (10.4.2) or (10.4.1) with (10.4.3), we have a coupled hyperbolic-parabolic system. To illustrate the differences between (10.4.2) and (10.4.3), we assume inflow (U > 0) at x = 0 and require the boundary condition u = v = 0 at x = 0. Whereas the boundary x = 0 is characteristic for the equation (10.4.2), the variable p is an ingoing characteristic variable for (10.4.3). Therefore, no boundary condition for p is needed with (10.4.2), but (10.4.3) requires a boundary condition. For example, one can prescribe
+
P(0,Y7 t ) = 0. For the limit-equations ( E = 0), no boundary condition for p is allowed. In Kreiss, Lorenz, and Naughton (1988) it is shown that convergence for E -+ 0 is also obtained with (10.4.3), at least away from a boundary layer at x = 0.
APPENDIX
1
Notations and Results from Linear Algebra
Vectors and matrices. Let C denote the field of complex numbers and let C” be the vector space of column vectors u=
(7).
E C , j = 1, ..., n.
uj
Un
We define an inner product and a norm by n
( u , v )= c ; i z . I v j ,
1241
=
(U,U)l’*,
u,v E C”.
j=l
Here Ej is the complex conjugate of by n matrix, then
uj.
-T
A’ = A
If A = ( a j k ) E C’”.” is a complex n
= (Tik3)
denotes the complex conjugate transpose of A . It holds that (u, Av) =
(A*u,u) for all u , 21 E C T L .
The spectral-norm of A is
IAl = max{ lAul : u E C n , IuJ= l } .
361
362
Initial-Boundary Value Problems and the Navier-Stokes Equations
One can show that
[A(' = p(A*A) where p (B) denotes the spectral radius of a matrix B, i.e., the largest absolute value of all eigenvalues of B. A matrix U E C"." is called unitary if
U*U = I . i.e. U-' = U* If U is unitary then, for any u E C", IUu12 = ( U u ,U u ) = (U'UU, u ) = IuI 2 ,
and therefore
IUI = J U - ' l = ( U * l = 1. A matrix U with columns u' , ... ,u" E C" is unitary if and only if
1 for j = Ic, 0 for j # k;
( u j , u k ) = sj, =
i.e., the columns form an orthonormal system. An important result from linear algebra is
Schur's Theorem. Let A E C"," denote a matrix with eigenvalues A ] , . . . , A, in any prescribed order. There is a unitary matrix U such that U*AU = R = ( r j k ) is upper triangular with diagonal entries
rjj
= A j , j = 1, . . . , n.
Proof. We use induction on n; the case n = 1 is trivial. Let Au' = A IU ' , lull = 1. One can choose an orthonormal basis u',
u2, ..., un
of C" starting with u l . The matrix U1 with columns u ' , .. . ,un is unitary, and
The matrix A2 has the eigenvalues such that
A2,
...,A,.
There is a unitary matrix U2
A2U2 = U2R2, where R2 is upper triangular and
X2,.
.. ,A, appear on the diagonal. If we set
Notations and Results from Linear Algebra
then
and the induction is completed.
363
This Page Intentionally Left Blank
APPENDIX
2
Interpolation
+
Fourier interpolation in ID. Let m E {1,2, ...}, h = (2m l ) - ' , xu = vh, v = 0, f l , f 2 , .. . . Suppose that v(z) is a 1-periodic function, v(x) = w(x l), defined at all gridpoints x = xu. We want to interpolate v(x) by a Fourier polynomial
+
m
(A.2.1) k=-m
at all grid points: f l , f 2 , . ...
(A.2.2)
w ( z u )= v(z,),
Theorem A.2.1. (A.2.1).
The interpolation problem (A.2.2) has a unique solution
Y = 0,
Proof. If we introduce the inner product 2m
then the gridfunctions e2nikx
,
k=-m,-m+1,
..., m,
366
Initial-Boundary Value Problems and the Navier-Stokes Equations
form an orthonormal system, i.e., ( e 2 d x , e2nikx)h
=
{
0 ifO
The above result is obvious for k = 1 and follows from the geometric-sum formula otherwise. Consequently, if w(x) is an interpolant of the form (A.2.11, then (e2az’z,u ~ ( x )=) (e2xi‘z, ~ w(x)) =
C m
ak(e2ai/3c, e2aikz ) h
= al‘
k=-m
Thus the coefficientsal are uniquely determined by the data function ~ ( x )Also, . we can consider the interpolation-condition 777
C
ake2xikuh
= zt(xc,), v = 0,..., 2m,
+
as a linear system of 2m + 1 equations for the 2m 1 unknown ak. Since the solution vector is unique (if it exists), the system-matrix is nonsingular, and existence follows. Fourier interpolation is very useful since the interpolant w(x) inherits “smoothness” from the data v(x), with estimates independent of h. More precisely, if we introduce norms by
then the following result holds:
Theorem A.2.2.
I f w ( z )denotes the Fourier interpolant of the data v(x) then m.
k=-m
and
It is important that the factor ( 1 r / 2 ) ~ Pdoes not depend on h.
Proof. The first equation is nothing but Parseval’s relation; it applies since the functions e2xikx
,
lkl 5 m,
367
Interpolation
are orthonormal w.r.t. the continuous and discrete inner products. Therefore, differentiation of w ( z ) gives us m
k=-na
Since
k=-m
we find that
."
k=-m Here l e 2 T z y- 1
I2 = I 2sinrlch z h
I
sinirlch z (27rlc)Z 2 (-)z(27rk)2, 2 ir
and the result follows.
Fourier interpolation in more space dimensions. The generalization to s space dimensions is straightforward. Suppose u = v(x), x = (21,. . . ,x,), is a function of s variables which is 1-periodic in each variable xl and which is defined at all gridpoints ( q h ,y h , ... ,v,h), V I = 0, f l , f 2 , ... . Then there is a unique Fourier polynomial s
m
l=l klx-m
which interpolates v at all gridpoints, w(vlh ,... , ~ , h = ) u(v,h,... , ~ , h ) ,
~1
E Z.
As in Theorem A.2.2, derivatives of w can be estimated in terms of corresponding divided differences of v; the constants in the estimates are independent of h.
Interpolation of nonperiodic functions in ID. s Consider a discrete function f defined on a grid x, = uh, h = 1/N, u = 0 , 1 , 2 , . . . , N . We want to interpolate f so that the derivatives of the interpolant can be estimated in terms of the divided differences of f , with constants independent of h. There are many
368
Initial-Boundary Value Problems and the Navier-Stokes Equations
ways to do this. Here we first extend f to a periodic gridfunction so that bounds of divided differences are preserved. Then we use Fourier interpolation to obtain the desired interpolant. For transparency, we describe the corresponding extension of smooth functions first. Consider a function f E C P [ O , 11, and let 0 < 6 < be given. We will extend the domain of definition o f f to -00 < x < 00. The extended function, again denoted by f, will have its support in -6 5 x 5 1 6. Furthermore,
+
Here C depends on 6 and p but not on f , and 11 . I ( E , 11 denote the L2-norms over the whole line and the original interval, respectively. To begin with, let us preliminarily define f (z) for 1 5 x 5 3/2 as the solution of the differential equation DPu = 0,
1 5x
5 312,
with initial conditions Dju(1) = D j f ( l ) , j = 0, 1 , 2 , . . . , p - 1 . The solution is 0-1
j =O
. J'
(Note that the p-th derivative of the extended function jumps at x = 1 , in general. This is not essential, however.) For x 5 0 we use the corresponding construction. Now we modify the function so that its support becomes compact. To this end, let cp E C" denote a cut-off function with
Then the desired extension is given by cp f. By the Sobolev inequality stated in LemmaA.3.10, wecanestimate lDjf(l)l, lDjf(O)l, j = O , 1, 2 , . . . , p - 1, in terms of llDP f 11 and 11 f 11, and therefore we have proved
4.
Lemma A.2.3. Let f E CP be definedfor 0 5 x 5 1, and let 0 < 6 < One can extend the definition o f f to -00 < x < 00 so that the extended function f has its support in -6 5 x 5 1 + 6 and furfrlls (A.2.3). The constant in (A.2.3) is independent o f f .
369
Interpolation
We consider now a discrete function. Let x,,= vh, v = 0, f1 , f 2 , . .. , h = 1/N, denote a grid and let f v = f(x,,), v = 0 , 1 , 2 , . . . , N, be defined at the gridpoints 0 5 x,,5 1. We prove
Lemma A.2.4. For any p we can extend the definition of f,, to the whole discrete line so that the support of f,, is contained in the interval - 5 x 5 1 $ and
+
cP j + fl l L , m P
(A.2.4)
j=O
cIl~j+fll:,N-j P
I const
.
j=O
The extension and the constant depend on p , but the constant does not depend on f or h.
Proof. The proof proceeds similarly to the continous case. For 1 I x,, 5 we define f,, = f(x,,) preliminarily as the solution of the difference equation (A.2.5)
D P _ u N + ~ = O ,p = l , 2 , ... .
As in the continous case. the solution can be written down. It has the form
UN+p = pp-l(xp), where Pp- 1 ( 5 )is a polynomial of degree 5 p - 1, whose coefficients are divided differences D l f,,, N - p 5 u 5 N , j = 0, I , 2 , . . . , p - 1. For x < 0 we make the corresponding construction. Then cp f is the desired extension. This extension is again denoted by f. By the discrete Sobolev inequality stated in Lemma A.3.18, we can estimate D! f,, in terms of IlD:f and [If and therefore we obtain the estimate (A.2.4). We can consider the extended gridfunction f as a periodic function with period 2. If w denotes its Fourier interpolant, then
j =O
j =O
j =O
The latter estimate follows from Theorem A.2.2 and formula (A.2.4). We have proved
Theorem A.2.5. Let f,, = f(x,,) denote a discrete function, where xu = vh, h = 1/N, u = 0 , l ,2,. . . , N . Let p denote a positive integer. We can interpolate f by a function w E Cm[O,11 so that
370
Initial-Boundary Value Problems and the Navier-Stokes Equations D
U
j =O
j=O
The interpolant and the constant depend on p ; the constant is independent off and h, however.
Extensions of functions in a strip. We shall now generalize the results to a strip
I : 05x51,
-oo
and start again with the continous case. L e t f = f(x,y), f E C 2 P ( I ) , and assume that f is 1-periodic in y. For every fixed y we use the construction given above. For x > 1 we obtain
Therefore,
Thus, we need the L2-norms of the derivatives of order 2 p to estimate llaPf/ayp\lE.
Lemma A.2.6.
We can extend the definition off so that
The corresponding interpolation result is also clear: For every p we can find an interpolant whose derivatives up to order p can be estimated in terms of divided differences of order 2p. All these results can be extended in a straightforward way to functions in a strip of s dimensions.
APPENDIX
3
Sobolev Inequalities
We show here some frequently used inequalities which express bounds of one norm of a function (or of a derivative of a function) in terms of other norms of the same function and its derivatives. Typical examples are so-called Sobolev inequalities which give bounds of the maximum norm of a function in terms of L2-norms of derivatives. It is important that the constants entering these estimates do not depend on any specific function under consideration, but are uniform for a certain class of functions. To derive such estimates, we may always assume the functions to be C"smooth, for convenience. (The functions take values in Cn.)Then the estimate extends to all (less smooth) functions which can be approximated by C"functions w.r.t. the norms entering the estimate.
Lz-estimates of periodic functions. Let u E C"(R), u(x)= u ( x u is L-periodic. As usual,
1
+ L); i.e.,
L
ll.1~11~ =
IU(Z)l2dx
We first show
Lemma A.3.1.
For all
t
> 0 and all integers j , k 2 1 it holds that
37I
372
Initial-Boundary Value Problems and the Navier-Stokes Equations
Proof. By Fourier expansion, (A.3.1)
and Parseval's relation yields that
Therefore, the lemma is proved if we can show that
The function
has its minimum at
and
Hence the assertion follows. A generalization to any number of space dimensions is straightforward. Let u E Crn(RS)be L-periodic in each variable x1, and denote
We use the notations
373
Sobolev Inequalities
Ji
i.e., measures the “clean” p-th derivatives whereas I . 1~~ derivatives. For any multi-index v,
measures all p-th
where the sum extends over all vectors w = (wl l . . . w,) with integer components. If lvl = p then W?”l
.. . W3”S 5 w:p
+ . .. + W~?,
and therefore 110Vu1125
J$d,
p = 1vI.
Thus one obtains the inclusion
Jib)F IulLp F K J i ( u ) ,
(A.3.2)
where K = K ( p ,s) is the number of multi-indices v of order p. A direct generalization of the previous lemma to s space dimensions is
Lemma A.3.2. (A.3.3)
For all
E
> 0 and all integers j , k 2 1 it holds that
J i b ) I €Jj2+k(u)+ s e - q u 1 1 2 .
The proof follows by Parseval’s relation and the argument given in the proof of Lemma A.3.1. Because of the inclusion (A.3.2), we also have
Lemma A.3.3. (A.3.4)
For all
E
l U I2H ,
> 0 and all integers j , k 2 1 it holds that
I EIUILJ+k + C € - j l k u II II
1
where C is independent of E , u , and L.
Functions with compact support. Let u E CF(R“)and denote
If L
> 0 is so large that the support of u is contained in [-L/2, L/21”,
then we can identify u with an L-periodic function and apply the previous results. Since the estimates are independent of L, we obtain the inequalities (A.3.3), (A.3.4) for all u E CF,
374
Initial-Boundary Value Problems and the Navier-Stokes Equations
Maximum norm estimates of periodic functions. We start again with one space dimension and consider an L-periodic function u E C"(R),
u(z)
= u(z + L ) .
For convenience we assume throughout that L
1 ; we first show
Lemma A.3.4. For each integer k 2 1 there is a constant CI,independent of u , O < t I 1 , a n d L L 1 with IuIm 2 < + p u 1 1 2 + C k p / ( 2 k - I ) llu112.
Proof. From the representation of u ( z ) as a Fourier sum and the CauchySchwarz inequality we obtain
w=--00
w
w
=: PI P2.
To estimate P I ,we observe that
+ 1 ) 2 I 2€2127rW/L12k+ 2
(427rw/LJk and find, by Parseval's relation,
PI 5 22110ku112
+ 21121112.
To estimate P2, we write
P2 = 1 + 2 C { r ( 2 n r J / L ) k + 1 } - 2 w= I
375
Sobolev Inequalities
For the last estimate we used the restriction
then the assertion follows.
A key result in obtaining Sobolev inequalities in s space dimensions is formulated next; a proof can be given by transformation to polar coordinates. This result is responsible for the requirement k > s / 2 in Theorem A.3.6 and it shows why'maximum norm estimates depend on the number s of space dimensions.
Lemma A.3.5.
The integral
is finite i f and only i f k
> s/2.
Now let u E C"(R") be L-periodic in each variable T I . The following result is (a version of) Sobolev's inequality.
Theorem A.3.6. For- each integer k 2 [s/2] independent of u , 0 < E 5 1, and L 2 1 with
5 t J f ( u ) + c,.J.t+(*J.-s) Proof.
From the representation of
+ 1 there is a constant C,5sk II 11 II ?. .
as a Fourier sum* we have that
*We can assume 0 < t 5 I to be given and can solve for f > 0. Then 0 < 6 5 I . if 4cr. *The sums extend over all vectors UJ = ( U J I . ...,LL.',~)with integer components q .
2
I.
376
Initial-Boundary Value Problems and the Navier-Stokes Equations
W
W
.
{ C {E)27rbJI/LJk+ . . . + 427rw,/L)k + 1}-2} W
=: P, P2.
Here
PI 5
C I.;(w)12(s+ 1){E2(27rWI/L)2k+ . . . + 2(27rws/L)2k + I } W
= (s
+
+ 11u112}.
1){62J;(u)
To estimate P2, we first sum only over those w for which all components w1 # 0. Then the sum can be bounded by an integral:
{~127rw1/+ L (... ~
(A.3.5)
- (6-l/k-
L 1" 27r
s,.
{ IYl lk
+ ~127rw,/LI~+ 1}-2dw
+ . . . + I Y s T + 1} -2
dy.
It is not difficult to show that
{
+ .. . + IY,Jk +
+
2 s-klY)2k 1,
and using the previous lemma, we obtain that the above integral is finite. Therefore,
p2 5 c s , k ( ~ - l l k L ) s . If we sum the expressions in (A.3.5) over all w with w, = 0, w1 # 0 for 1 = 1, . . . , s - 1, say, then we obtain in the same way a bound of the corresponding sum by c,-
I,k(6-
' I k L)"- .
Therefore,
P2 5 c;,k(l + ( 6 - 1 1 k L ) s )
5 2C:,k(6-'1kL)8.
377
Sobolev Inequalities
Only in the latter estimate have we used that 0 < E 5 I 5 L. To summarize,
I?& 5 L--"PIP2 5 cY~~(E k(U) ~ -+~ E - s' l/k ~11 J41 ~ 2}
1
and if we call C;,kE2-s/1;
- 6,-
then the assertion follows. One can also estimate derivatives of a function in maximum norm. The following result is a simple implication of the previous theorem and Lemma A.3.3. Again, we assume u E CX(RY)to be L-periodic in each variable. Lemma A.3.7.
Let IvJ = j 2 1, k 2 [s/2] independent of u , 0 < E 5 1, and L 2 1 with
[DV&
+ 1.
There is a constant C
I E J j 2 + k ( U ) + c ~ - ( 2 j + s ) / ( 2 ~ -1~1 ~4 ) 2,I4 = j .
Estimates by a product. It is sometimes convenient to have estimates by a product. For example, if we use Theorem A.3.6 for k = s, we obtain (A.3.6) If
E
lulk 5 d ; ( u ) + C ~ - ' ( / U ( ( ~ .
= IluII/Js(u) _< 1, then
I (1 + C)ll~IlJs(u). In the other case, I(u11 > J,(u), we apply (A.3.6) with
I& I ( 1 + c ) l 1 4 2 .
E
= 1:
378
Initial-Boundary Value Problems and the Navier-Stokes Equations
Thus we have proved
We apply this result to D”u instead of u and find
Lemma A.3.8. with
There is a constant C = C ( j ,s) independent of u and L 2 1
I D V ~I~CJj(u)(Js+j(u) L + Jj(u)),
j =
I~I.
Nonperiodic functions on an interval. Let u = u(x), 0 I x 5 L, denote a C”-function with values in C“. There are points 5 0 ,X I with 1u(q,)I = min lu(x)l, Iu(xl)l = max 1u(x)1= IuI,. O
O<.C
From
we find that
14,2 5 ~ll.ll2 1 + 2 1141llU+ll (A.3.8) <
for any
E
> 0. Similarly,
6
>0
1
6
ll%1I2 + (; +
1
z)1I4l2
(A.3.9)
for any
, >~0. We can use these formulae to show
Lemma A.3.9. There is C > 0 independent of 0 < u E C” [O, L ] with (A.3.10)
2
C
ll%ll 5 ~ll%zl12+ ~llul12.
E
5 I, L 2
1, and
Sobolev Inequalities
379
Proof. From (A.3.8) follows
In (A.3.9) we choose 7 = c/& and estimate formulae with (y=-
lulk
and Iuzl& using the above
J; p = & . 2c '
Then the choice c = 4(1
+ -)& L
proves the result. In the following lemma we generalize the formulae (A.3.8), (A.3.10). The dependence of the constants Ci on will be discussed below.
Lemma A.3.10. Let j 2 0, k 2 1 denote integers, and let 0 < E 5 1. There are constants C, = Cia, k , E ) , i = 1,2, independent of L 2 1 and u E Cm[O,L ] with €IJDj+kt$
+ ClllU(12,
1. € I ) D j + k U l l *
+ C211u(12
lDju12, 5 IlDju112
d
D =-
dx'
Proof. First let k = 1 . The estimates are shown for j = 0, and we assume that they are valid for some j . Then (by (A.3.10)) )1Dj+*UII2
5
EllDj+2U11*
c + -IlDjU112 E C
I EI(Dj+2u1)2 + T{ € I IIDj+'u112+ C2(€,)lIU112}. If we choose here € 1 = E / ( ~ C )then , the desired estimate for IlDj+'ull follows. Similarly, (by (A.3.8))
(Dj+'
ul,
< - €1(Dj+2U112+
2
-1pj+Iu112 €
380
Initial-Boundary Value Problems and the Navier-Stokes Equations
and the choice € 1 = c2 finishes the induction w.r.t. j. The generalization from k = 1 to arbitrary k is straightforward.
In the previous lemma we did not keep track of the dependence of Cion E. However, since the constants are independent of L 2 1, we can determine this dependence by scaling the x-variable. One obtains Theorem A.3.11. Let j L 0, k 2 1 denote integers. There are constants = CiiCj, k), i = 1,2, independent of 0 < E 5 1, L 2 1, and u E Cw[O,L ] with
ci
pju12, 5 EIJDj+kul(2 + ~lc-(2j+1)/(2k-l)
1 1 ~ 1 1 2 1
+
5
((Dju1)2 EI(Dj+kU))2 C2E-jqU112.
Proof. Suppose that a(?), 0 5 2 5 L, is given; we define for 0 < h 5 1 U(X) := ii(hx),
0 5 x 5 L/h.
If one observes that D j u ( x ) = hjDjii(4), 2 = hx, 1 llul12 = ~1142
and applies the previous lemma to u(x)with L2-estimatesfor functions in a strip. defined in the strip
x
= ( X I Z-), , 0
which is 1-periodic in expansion,
x2,.
5 ~1 5 1,
. . ,2,.
E
= 1, then the result follows.
Suppose that u = u(x)is a C"-function X- = ( 2 2 , .
.. ,x,) E RS-l,
For each fixed X I one obtains, by Fourier
where the sum extends over all vectors w- = (w2,. . . ,w,) with w j E 2
and
381
Sobolev Inequalities
Parseval’s relation yields
with
We first want to show that we can estimate the L2-norm of any derivative by “clean” derivatives. As in the periodic case, let
Lemma A.3.12.
There is a constant C = C ( j )independent of u with
8 l l D ” ~ l5 ( ~C J ~ ( U ) D” , = Dy’ . .. Dus
1
j = vI
+ .. . + v,.
Proof. With Parseval’s relation, (A.3.11)
IJDvu112=
c
IJD;1c(.,w-)112(2.irw2)2”2 .. .(27rw,9)2”,-.
W-
Case I .
vl = 0. From w;”?..w:u”
<wy+
...+ w,2j
one obtains the estimate
IID”u112 IllD;u112
. . . = v,
+ . . . + IIDJsul12.
= 0. Here trivially llD’u112 = llD{u1(*.
Case 2.
v1 = j , thus
Case 3.
1 I v~ I j - 1 . An application of Theorem A.3.11 yields
lp;’c(.,
v2 =
w-)JI 2 5 c l p ; f i ( . , w-)112
+
Cfj-””’V-’
Iv-I = y + ...+ v,. We can assume that Wi”2
. . .W,2”8 # 0
llfi(.,w-)l12~
382
Initial-Boundary Value Problems and the Navier-Stokes Equations
and set E
{
-1
= (2Kw2)2~.. . (2nw3)2~3}
.
Then we find from (A.3.11)
If we set
then
and a2
+ ... + a , = v2 + ... + v, + VI = j.
Therefore,
.. .w,3 5 w22j + . .. + w t j , and the result follows. Next we generalize Lemma A.3.2 to functions defined in a strip.
Lemma A.3.13. independent of 0
Let j,k 2 1 denote integers. There is a constant C = Cu, k)
< c 5 1 and u with
+
q u ) 5 d ; + k ( u ) C€+/'"llZL11*.
Proof. We first estimate Dfu:
w
For each fixed w- we can apply Theorem A.3.11 to C(., w-),and summation over w- gives the desired estimate of Dfu. For I = 2 , . . . , s,
383
Sobolev Inequalities
llJq~Il2=
c
JJQ(.,W-)l12(2~W1)2j,
w-
and we can argue as in the proof on Lemma A.3.1.
Maximum norm estimates for functions in a strip. As before, let u = u(x) denote a C%-function defined in the strip x = ( I c ~ , z - ) , 0 5 ~ 51 1, 2- = ( 2 2
,... , X , ) € R " - I ,
which is I-periodic in 2 2 , . . . , x,. The following estimate of )u),is sometimes useful since it requires only one differentiation in the nonperiodic x1-direction. Specializations of the result to 2- and 3-dimensional strips will be given below.
Theorem A.3.14.
Let /3, y denote integers with 20:=p+-y>s-l
r>p>O.
and
There is a constant C = C(s) independent of u and 0 < €,
E',
€I'
5
1
with
Here we have used the notation
Proof. From the Fourier representation of u(z),
=: PIP,. As in the proof of Theorem A.3.6,
384
Initial-Boundary Value Problems and the Navier-Stokes Equations
If we observe that y 2 cr and sum over w- , then the assertion follows. A 2 0 strip. In the previous theorem we set s=2,
cr=P=y=l,
I
E = E
I/
=€,
and obtain the estimate
As an implication we note
Lemma A.3.15.
Consider a Cm-jiunction u = u(x,y) defined in the strip 05z51,
--o0
which is 1-periodic in y. Then
Proof. If
then (A.3.12) yields the estimate. Otherwise I(urYll < IIuII, and we obtain the result from (A.3.12) upon choosing E = 1 .
385
Sobolev Inequalities
A 3 0 strip.
In Theorem A.3.14 we set s=3,
d=1,
",22,
@=I,
€I1=€.
and obtain, for 0 < c 5 1,
(A.3.13)
C
C
+ $112
+ $Il2.
Similarly as before, we can derive from this an estimate by products.
Lemma A.3.16.
Consider a C"-function u = u(x,y, i) defined in the strip 05zil,
which is I-periodic in y and in
2.
lul& I const{ Ilw,llH
--Oo
Then
+ I1u,1l2 + IIuII'/~H'/~+ 11~11'}
with
H2 =
11%Y112
+ 11%z112 + 1 1 ~ ~ ? / 1 l+2 l l ~ z z l l 2 .
Proof. If 6
= H-'
{ I l 4 + IlWH'/*}< 1 -
then (A.3.13) yields the estimate. Otherwise
H < 2 1 ( ~ ~or ~ l lH < 2 1 ( ~ 1 ( ' / ~ N ' / ~ , and we obtain the result from (A.3.13) upon choosing
t
= 1.
Discrete Sobolev inequalities for periodic functions. Let m E { 1 , 2 , . . .}) h = (27n l ) - ' , and define a grid ,c, = vh, Y = 0, f l , *2,. . . . Suppose that u = u ( z )is a I-periodic gridfunction, u(x)= u(x I), which is defined at all gridpoints z = 2,. We want to show that discrete analogs of the Sobolev inequalities hold with constants independent of h. For notations, see Section 3.2.2.
+
Lemma A.3.17.
+
For
t
> 0, j , k 2
1 it holds that
Il+ll'h
5 tllD3++"U/I:,
+ CI(dI141;L?
IP:.IL
L ~II~:+"UII:,
+ C2(f)llUI12h
with constants C1.2(t)independent of h.
386
Initial-Boundary Value Problems and the Navier-Stokes Equations
Proof. Denote by w = W(Z) the Fourier interpolant of u. Since D$u, = D$w, = D3u1(<,) for some point t,,, we have ID:uI, 5 103.~11,. Now the second inequality follows from Lemma A.3.7 (with s=l) and Theorem A.2.2. Clearly, the first inequality follows from the second. In the same way we can obtain discrete Sobolev inequalities for periodic functions in more space dimensions.
Nonperiodic discrete functions on an interval. Now we assume that u, = u(z,), xu = vh, v = 0,1,2,. . . ,N , N h = 1, is defined for gridpoints x u with 0 5 z, 5 1. As before, D+u, = (u,+I - u,)/h for v = 0 , . .. , N - 1, and we use the notation
We have .s+
I
4
387
Sobolev Inequalities
As in the continuous case, we can use (A.3.19, (A.3.16) to prove
Lemma A.3.18. Let h = 1/N and let u , = u(x,), z, = v h , v = 0, 1,2, . . . , N , denote a gridfunction. Then the following discrete Sobolev inequalities hold: 2
IID:4lO,N-j O S max v
lD:UUl2
<
11 D"+'k 110,2 N
-j
5tllD;+"ull&v-j-k
-I:
2 + cl(f) 11 u110, N
+
i
2 ~ 2 ( ~ ) 1 1 ~ 1 1 " . N lc ,
2 1,
with constants independent of h. Discrete analogs of our estimates for functions defined in a strip are also valid; this can be shown by Fourier interpolation in the periodic directions.
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APPENDIX
4
Application of the Arzela-Ascoli Theorem
We will use the following result proved in analysis. It is (a special case of) the Arzela-Ascoli Theorem.
Theorem A.4.1. Let R C R" be a closed bounded set, and let u,, : CR denote a sequence of functions with the following properties: (i) For each t
--f
C'l
> 0, there is a 6 > 0 independent of m with IUm(Y)
- ~,n(Y?I
I 6 if
IY - Y'l
I6,
y, Yl E R.
(ii) There is a K independent of rn with Iu,(y)I
5 K for all y
Then there is a continuous function u : 62 m3 -+ 00 with
max IU*rJY)
-
YE0
.(y)l
-+
E R and all m.
---f
C7', and a sequence of indices
0 as
m3
+
m.
To apply the result, assume that we have a sequence of functions U,(Z,t),
0
I z 5 1,
0 5 t 5 T,
389
Initial-Boundary Value Problems and the Navier-Stokes Equations
390
which is uniformly smooth; i.e., u , E C" for all rn, and for all nonnegative integers p, q there is a constant C@,q ) independent of m with
We want to show:
Theorem A.4.2.
There is a function u E C", and a sequence mj
-+
m with
In short, a subsequence of u,, converges along with all its derivatives to a C"limit.
Proof. By the Arzela-Ascoli Theorem there is a continuous u and a sequence m = mj --+ m with Iur,&- u1,
-+
0 as m = mj
-+
00.
Now apply the Arzela-Ascoli result to the sequence
and obtain the existence of a continuous v and a sequence j k
From
we conclude that for m = mj,
--+
m,
u(x,t ) - u(0,t ) =
LX
Hence u is differentiable w.r.t. x , and (A.4.1) Let us show that
(A.4.2)
dU = v. dX
v ( l l t )d<.
-+
m with
391
Application of the Arzela-Ascoli Theorem
i.e., we have convergence as mj + 00, not just for the subsequence mj,. This follows from a general argument which we formulate for a sequence of numbers only. The generalization to a sequence of functions is straightforward.
Lemma A.4.3.
Let bj denote a sequence of numbers, and suppose that
(i) Each subsequence bj, has a convergent subsequence. (ii) All convergent subsequences of bj converge to the same limit b.
Then bj
+ bas
j
+ 00.
Proof. If bj does not converge to b, then there is an j k + 00 with Ibj, - bl 2
E
t
> 0 and a sequence
for all j,.
However, according to (i), (ii) there is a subsequence of contradiction.
bj,
converging to b, a
Let us continue the proof of Theorem A.4.2. Since all possible limits of subsequences of du,,/dz equal d u / d z (see (A.4.1)), we obtain the result (A.4.2). Clearly, the existence of du/& and convergence du Idu, F- %I"
+O
asm=mj-+O
follow in the same way. Also, we can apply the previous arguments to du,, and differentiability of d u / d z follows, etc. This proves the theorem.
/ax,
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Author Index
A Agmon, S., 384 Agranovich, M.S., 321, 324
F Friedman, A., 119 Friedrichs, K.O., 119, 176, 323
B Brenner, P., 119 C Carrier, G.F., 119. 272 Chorin, A,, 9 Courant, R., 119, 176
G GArding, L., 79, 97 Gilbarg, D., 176 Gindinkin, S., 324 Glimrn. J., 176 Gurtin, M., 16 Gustafsson, B., 119, 322, 324 H
D Di Perna, R., 176
E Eidelrnan, S.D., 119, 324 Eskin, (3.1.. 187. 320, 324
Hadamard, J., 79 Henshaw, W.D., 336 Hernquist, C.D., 202 Hersch, R.,323 Hilbert, D., I19 Hopf, E., 156 Hughes, T.J.R., 12 399
400
Initial-Boundary Value Problems and the Navier-Stokes Equations J
John, F., 176, 202
P Pearson, C.E., 119, 272 Petrovskii, I.G., 79, 119, 202 Protter, M.H., 156
K Kasahara, K., 79 Kreiss, H.-0.. 79, 119, 202, 273, 319, 324, 336, 359, 360
R Ralston, J.V., 324 Rauch, J., 319, 321, 324 Reyna, L.G., 336 Richtmeyer, R.D., I 18
L Ladyzhenskaya, O.A., 176, 323. 325 Landau, L.D., 176 Lax, P.D., 176 Leray. J., 202 Lifshitz, E.M., 176 Lions, J.L., 323 Liu, T.P., 176 Lorenz, J., 360
S Sakamoto, R., 324 Senin, J., 9 Sjoberg, A,. 157 Smoller, J., 176 Solonnikov, V.A., 176, 324 Strang, W.G., 79 Strikwerda, J., 322, 323 Sundstrom, A., 1 19, 32 I , 322, 324
M Majda, A.. 176, 321 Marsden, J.E., 9, 12 Martins, L., 16 Matano, J.. 156 Meyer, R.. 9 Michelson, D., 118, 322, 323, 324 Mizohata, S., 202 Morton, K.W., 119
N
T Temam, R.. 325
U Uralceva, N.N., 176
V Vishik, M.I., 324 Volevich, L., 324 von Wahl, W., 325, 343
Naughton, M., 360 Nirenberg, L., 187, 320
0 Oleinik, O.A., 157 Oliger, J., 119, 321 Osher, S.. 118. 321, 324
W Weinberger, H.F., 156 Whitham, G.B., 156, 157, 176
Y Yamaguti, M., 79
Subject Index
A Arzela-Ascoli theorem, 389 Asymptotic expansion, 168
Deformation tensor, 15 Difference approximation (scheme), 89, 127, 179, 183, 207, 219, 288 Dirichlet boundary condition, 214, 226 Duhamel’s principle, 70
B Bounded derivative principle, 359 Burgers’ equation, 4, 122, 141 C Cauchy-Riemann system, 327, 338 Characteristic (line), 103, 107, 142, 254 characteristic boundary, 266, 283 noncharacteristic boundary, 255, 259 characteristic variables, 254 Continuity equation, 2, 13 Couette experiment, 16 D
D l D t operator, 2, 12
E Energy norm, 70 Entropy condition, 157 Eulerian description, 11 Euler equations, 15, 59 compressible, 59, 197 incompressible, 3, 15 linearized, 59, 302
F Finite speed of propagation, 110, 182, 288 Fourier interpolation, 365 Fourier transform, 35
40 J
402
Initial-Boundary Value Problems and the Navier-Stokes Equations
G Generalized solution. 42, 98, 135, 207 Gronwall's lemma, 84 H Heat equation, 25, 43, 204 backward, 25 Hyperbolic system, 29, 55, 75, 161 strictly hyperbolic, 57, 102 strongly hyperbolic. 31, 57, 75, 102, 186 symmetric hyperbolic. 57, 60,100, 181, 191,
283 weakly hyperbolic, 29, 57 I
P Parabolic system, 32, 61, 77, 96, 180 strongly parabolic, 82, 178, 276 Parseval's relation, 35 Picard's lemma, 108 Poisson's equation, 349 Pseudodifferential operator, 187, 320
R Rankine-Hugoniot jump condition, 150 Rarefaction, 152 Resolvent condition, 45 Reynolds number, 18
Initialization. 358 Ill-posed problem, 29, 36, 39, 248
S K Korteweg-de Vries equation, 157 linearized, 116, 271
L Lagrangian description, I I Laplace's equation, 349 Laplace transform. 235. 306 solution via, 239 Linearization, 2 I Localization principle, 21, 77 M Mach number, 7 Material derivative, 12 Matrix theorem, 45, 54 Maximum principle, 132, 335 Mixed (hyhrbok-parabolic) system, 62, I 1 1, 166, 172, 188, 262 Momentum equation, 2, 14 Mo-solution, 36 space, 34 N Navier-Stokes equations, 2, 16, 62 compressible, 2, 16, 62, 167 incompressible, 342 linearized, 62, 113, 188, 267, 355
Schrtidinger equation, 78, 117 Schur's theorem, 362 Semibounded operator, 70, 269 maximal semibounded, 270 Sobolev inequality, 94, 367 discrete, 385 Symbol (of a differential operator) 27, 75, 76 Symmetrizer, 75, 102, 161, 202, 317, 320
T Transport theorem, 12 Traveling wave, 144, 176
V
vorticity, 327, 330, 335, 337
W Wave equation, 29, 105 Weak solution, 5 , 148, 176 Well-posedness, 19, 39, 54, 74. 223. 225 operational definition of, 28 strongly well-posed, 224 strongly well-posed in the generalized sense.
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